SGI Freeware 1999 August

home *** CD-ROM | disk | FTP | other *** search

/ SGI Freeware 1999 August / SGI Freeware 1999 August.iso / dist / fw_gnuplot.idb / usr / freeware / doc / gnuplot / gnuplot.doc.z / gnuplot.doc

Wrap

Text File | 1998-05-21 | 226.1 KB | 5,780 lines

C RCS $Id: gnuplot.doc,v 1.61 1997/11/25 23:03:25 drd Exp $ C 10 October 1997 C Copyright (C) 1986 - 1993, 1997 Thomas Williams, Colin Kelley C ^ <h2> An Interactive Plotting Program </h2><p> ^ <h2> Thomas Williams & Colin Kelley</h2><p> ^ <h2> Version 3.6 organized by: David Denholm </h2><p> ^ <h2>Major contributors (alphabetic order):</h2> ^<ul><h3> ^<li> John Campbell ^<li> Robert Cunningham ^<li> David Denholm ^<li> Gershon Elber ^<li> Roger Fearick ^<li> Carsten Grammes ^<li> Thomas Koenig ^<li> David Kotz ^<li> Ed Kubaitis ^<li> Russell Lang ^<li> Alexander Lehmann ^<li> Carsten Steger ^<li> Tom Tkacik ^<li> Jos Van der Woude ^<li> Alex Woo ^</h3></ul> <p> ^<h2> Copyright (C) 1986 - 1993, 1997 Thomas Williams, Colin Kelley<p> ^ Mailing list for comments: info-gnuplot@dartmouth.edu <p> ^ Mailing list for bug reports: bug-gnuplot@dartmouth.edu<p> ^</h2><p> ^<h3> This manual was prepared by Dick Crawford</h3><p> ^<h3> 10 October 1997</h3><p> ^<hr> 1 gnuplot 2 Copyright ?copyright Copyright (C) 1986 - 1993, 1997 Thomas Williams, Colin Kelley Permission to use, copy, and distribute this software and its documentation for any purpose with or without fee is hereby granted, provided that the above copyright notice appears in all copies and that both that copyright notice and this permission notice appear in supporting documentation. Permission to modify the software is granted, but not the right to distribute the modified code. Modifications are to be distributed as patches to the released version. This software is provided "as is" without express or implied warranty. AUTHORS Original Software: Thomas Williams, Colin Kelley. Gnuplot 2.0 additions: Russell Lang, Dave Kotz, John Campbell. Gnuplot 3.0 additions: Gershon Elber and many others. 2 Introduction ?introduction ? `gnuplot` is a command-driven interactive function and data plotting program. It is case sensitive (commands and function names written in lowercase are not the same as those written in CAPS). All command names may be abbreviated as long as the abbreviation is not ambiguous. Any number of commands may appear on a line (with the exception that `load` or `call` must be the final command), separated by semicolons (;). Strings are indicated with quotes. They may be either single or double quotation marks, e.g., load "filename" cd 'dir' although there are some subtle differences (see `syntax` for more details). Any command-line arguments are assumed to be names of files containing `gnuplot` commands, with the exception of standard X11 arguments, which are processed first. Each file is loaded with the `load` command, in the order specified. `gnuplot` exits after the last file is processed. When no load files are named, `gnuplot` enters into an interactive mode. Many `gnuplot` commands have multiple options. These options must appear in the proper order, although unwanted ones may be omitted in most cases. Thus if the entire command is "command a b c", then "command a c" will probably work, but "command c a" will fail. Commands may extend over several input lines by ending each line but the last with a backslash (\). The backslash must be the _last_ character on each line. The effect is as if the backslash and newline were not there. That is, no white space is implied, nor is a comment terminated. Therefore, commenting out a continued line comments out the entire command (see `comment`). But note that if an error occurs somewhere on a multi-line command, the parser may not be able to locate precisely where the error is and in that case will not necessarily point to the correct line. In this document, curly braces ({}) denote optional arguments and a vertical bar (|) separates mutually exclusive choices. `gnuplot` keywords or `help` topics are indicated by backquotes or `boldface` (where available). Angle brackets (<>) are used to mark replaceable tokens. For on-line help on any topic, type `help` followed by the name of the topic or just `help` or `?` to get a menu of available topics. The new `gnuplot` user should begin by reading about the `plot` command (if on-line, type `help plot`). ^ <a href="http://www.nas.nasa.gov/~woo/gnuplot/simple/simple.html"> Simple Plots Demo </a> 2 Seeking-assistance ?seeking-assistance There is a mailing list for `gnuplot` users. Note, however, that the newsgroup comp.graphics.apps.gnuplot is identical to the mailing list (they both carry the same set of messages). We prefer that you read the messages through the newsgroup rather than subscribing to the mailing list. Administrative requests should be sent to majordomo@dartmouth.edu Send a message with the body (not the subject) consisting of the single word "help" (without the quotes) for more details. The address for mailing to list members is: info-gnuplot@dartmouth.edu Bug reports and code contributions should be mailed to: bug-gnuplot@dartmouth.edu The list of those interested in beta-test versions is: info-gnuplot-beta@dartmouth.edu There is also a World Wide Web page with up-to-date information, including known bugs: ^ <a href="http://www.cs.dartmouth.edu/gnuplot_info.html"> http://www.cs.dartmouth.edu/gnuplot ^ </a> Before seeking help, please check the ^ <a href="http://www.uni-karlsruhe.de/~ig25/gnuplot-faq.html"> FAQ (Frequently Asked Questions) list. ^ </a> If you do not have a copy of the FAQ, you may request a copy by email from the Majordomo address above, or see the WWW `gnuplot` page. When posting a question, please include full details of the version of `gnuplot`, the machine, and operating system you are using. A _small_ script demonstrating the problem may be useful. Function plots are preferable to datafile plots. If email-ing to info-gnuplot, please state whether or not you are subscribed to the list, so that users who use news will know to email a reply to you. There is a form for such postings on the WWW site. 2 What's New in version 3.6 ?what's-new Gnuplot version 3.6 contains many new features. This section gives a partial list and links to the new items in no particular order. 1. `fit f(x) 'file' via` uses the Marquardt-Levenberg method to fit data. (This is only slightly different from the `gnufit` patch available for 3.5.) 2. Greatly expanded `using` command. See `plot using`. 3. `set timefmt` allows for the use of dates as input and output for time series plots. See `Time/Date data` and ^ <a href="http://www.nas.nasa.gov/~woo/gnuplot/timefmt/timefmt.html"> timedat.dem. ^ </a> 4. Multiline labels and font selection in some drivers. 5. Minor (unlabeled) tics. See `set mxtics`. 6. `key` options for moving the key box in the page (and even outside of the plot), putting a title on it and a box around it, and more. See `set key`. 7. Multiplots on a single logical page with `set multiplot`. 8. Enhanced `postscript` driver with super/subscripts and font changes. (This was a separate driver (`enhpost`) that was available as a patch for 3.5.) 9. Second axes: use the top and right axes independently of the bottom and left, both for plotting and labels. See `plot`. 10. Special datafile names `'-'` and `""`. See `plot special-filenames`. 11. Additional coordinate systems for labels and arrows. See `coordinates`. 12. `set size` can try to plot with a specified aspect ratio. 13. `set missing` now treats missing data correctly. 14. The `call` command: `load` with arguments. 15. More flexible `range` commands with `reverse` and `writeback` keywords. 16. `set encoding` for multi-lingual encoding. 17. New `x11` driver with persistent and multiple windows. 18. New plotting styles: `xerrorbars`, `histeps`, `financebars` and more. See `set style`. 19. New tic label formats, including `"%l %L"` which uses the mantissa and exponents to a given base for labels. See `set format`. 20. New drivers, including `cgm` for inclusion into MS-Office applications and `gif` for serving plots to the WEB. 21. Smoothing and spline-fitting options for `plot`. See `plot smooth`. 22. `set margin` and `set origin` give much better control over where a graph appears on the page. 23. `set border` now controls each border individually. 24. The new commands `if` and `reread` allow command loops. 25. Point styles and sizes, line types and widths can be specified on the `plot` command. Line types and widths can also be specified for grids, borders, tics and arrows. See `plot with`. Furthermore these types may be combined and stored for further use. See `set linestyle`. 26. Text (labels, tic labels, and the time stamp) can be written vertically by those terminals capable of doing so. 2 Command-line-editing ?line-editing ?editing ?history ?command-line-editing Command-line editing is supported by the Unix, Atari, VMS, MS-DOS and OS/2 versions of `gnuplot`. Also, a history mechanism allows previous commands to be edited and re-executed. After the command line has been edited, a newline or carriage return will enter the entire line without regard to where the cursor is positioned. (The readline function in `gnuplot` is not the same as the readline used in GNU Bash and GNU Emacs. If the GNU version is desired, it may be selected instead of the `gnuplot` version at compile time.) The editing commands are as follows: @start table - first is interactive cleartext form `Line-editing`: ^B moves back a single character. ^F moves forward a single character. ^A moves to the beginning of the line. ^E moves to the end of the line. ^H and DEL delete the previous character. ^D deletes the current character. ^K deletes from current position to the end of line. ^L,^R redraws line in case it gets trashed. ^U deletes the entire line. ^W deletes the last word. `History`: ^P moves back through history. ^N moves forward through history. #Character && Function \\ \hline #\multicolumn{3}{|c|}{Line Editing}\\ #\verb~^B~ && move back a single character.\\ #\verb~^F~ && move forward a single character.\\ #\verb~^A~ && move to the beginning of the line.\\ #\verb~^E~ && move to the end of the line.\\ #\verb~^H, DEL~ && delete the previous character.\\ #\verb~^D~ && delete the current character.\\ #\verb~^K~ && delete from current position to the end of line.\\ #\verb~^L, ^R~ && redraw line in case it gets trashed.\\ #\verb~^U~ && delete the entire line. \\ #\verb~^W~ && delete from the current word to the end of line. \\ \hline #\multicolumn{3}{|c|}{History} \\ #\verb~^P~ && move back through history.\\ #\verb~^N~ && move forward through history.\\ %Character@@Function %_ %@@Line Editing %^B@@move back a single character. %^F@@move forward a single character. %^A@@move to the beginning of the line. %^E@@move to the end of the line. %^H, DEL@@delete the previous character. %^D@@delete the current character. %^K@@delete from current position to the end of line. %^L, ^R@@redraw line in case it gets trashed. %^U@@delete the entire line. %^W@@delete from the current word to the end of line. %_ %@@History %^P@@move back through history. %^N@@move forward through history. @end table On the IBM PC, the use of a TSR program such as DOSEDIT or CED may be desired for line editing. The default makefile assumes that this is the case; by default `gnuplot` will be compiled with no line-editing capability. If you want to use `gnuplot`'s line editing, set READLINE in the makefile and add readline.obj to the link file. The following arrow keys may be used on the IBM PC and Atari versions if readline is used: @start table - first is interactive cleartext form Left Arrow - same as ^B. Right Arrow - same as ^F. Ctrl Left Arrow - same as ^A. Ctrl Right Arrow - same as ^E. Up Arrow - same as ^P. Down Arrow - same as ^N. #Arrow key & Function & \\ \hline #Left & same as \verb~^B~. & \\ #Right & same as \verb~^F~. & \\ #Ctrl Left & same as \verb~^A~. & \\ #Ctrl Right & same as \verb~^E~. & \\ #Up & same as \verb~^P~. & \\ #Down & same as \verb~^N~. & \\ %Arrow key@@Function %_ %Left Arrow@@same as ^B. %Right Arrow@@same as ^F. %Ctrl Left Arrow@@same as ^A. %Ctrl Right Arrow@@same as ^E. %Up Arrow@@same as ^P. %Down Arrow@@same as ^N. %_ @end table The Atari version of readline defines some additional key aliases: @start table - first is interactive cleartext form Undo - same as ^L. Home - same as ^A. Ctrl Home - same as ^E. Esc - same as ^U. Help - `help` plus return. Ctrl Help - `help `. #Arrow key & Function & \\ \hline #Undo & same as \verb~^L~. & \\ #Home & same as \verb~^A~. & \\ #Ctrl Home & same as \verb~^E~. & \\ #Esc & same as \verb~^U~. & \\ #Help & `{\bf help}' plus return. & \\ #Ctrl Help & `{\bf help }'. & \\ %Arrow key@@Function %_ %Undo@@same as ^L. %Home@@same as ^A. %Ctrl Home@@same as ^E. %Esc@@same as ^U. %Help@@help plus return. %Ctrl Help@@help . %_ @end table 2 Comments ?comments Comments are supported as follows: a # may appear in most places in a line and `gnuplot` will ignore the rest of the line. It will not have this effect inside quotes, inside numbers (including complex numbers), inside command substitutions, etc. In short, it works anywhere it makes sense to work. 2 Coordinates ?coordinates The commands `set arrow`, `set key`, and `set label` allow you to draw something at an arbitrary position on the graph. This position is specified by the syntax: {<system>} <x>, {<system>} <y> {,{<system>} <z>} Each <system> can either be `first`, `second`, `graph` or `screen`. `first` places the x, y, or z coordinate in the system defined by the left and bottom axes; `second` places it in the system defined by the second axes (top and right); `graph` specifies the area within the axes---0,0 is bottom left and 1,1 is top right (for splot, 0,0,0 is bottom left of plotting area; use negative z to get to the base---see `set ticslevel`); and `screen` specifies the screen area (the entire area---not just the portion selected by `set size`), with 0,0 at bottom left and 1,1 at top right. If the coordinate system for x is not specified, `first` is used. If the system for y is not specified, the one used for x is adopted. If one (or more) axis is timeseries, the appropriate coordinate should be given as a quoted time string according to the `timefmt` format string. See `set xdata` and `set timefmt`. `gnuplot` will also accept an integer expression, which will be interpreted as seconds from 1 January 2000. 2 Environment ?environment A number of shell environment variables are understood by `gnuplot`. None of these are required, but may be useful. If GNUTERM is defined, it is used as the name of the terminal type to be used. This overrides any terminal type sensed by `gnuplot` on start-up, but is itself overridden by the .gnuplot (or equivalent) start-up file (see `start-up`) and, of course, by later explicit changes. On Unix, AmigaDOS, AtariTOS, MS-DOS and OS/2, GNUHELP may be defined to be the pathname of the HELP file (gnuplot.gih). On VMS, the logical name gnuplot$HELP should be defined as the name of the help library for `gnuplot`. The `gnuplot` help can be put inside any system help library, allowing access to help from both within and outside `gnuplot` if desired. On Unix, HOME is used as the name of a directory to search for a .gnuplot file if none is found in the current directory. On AmigaDOS, AtariTOS, MS-DOS and OS/2, gnuplot is used. On VMS, SYS$LOGIN: is used. See `help start-up`. On Unix, PAGER is used as an output filter for help messages. On Unix, AtariTOS and AmigaDOS, SHELL is used for the `shell` command. On MS-DOS and OS/2, COMSPEC is used for the `shell` command. On MS-DOS, if the BGI interface is used, BGI is used to point to the full path of the BGI drivers directory. Furthermore, SVGA is used to name the Super VGA BGI driver in 800x600 resolution and its mode of operation is Name.Mode. E.g., if the Super VGA driver is C:\TC\BGI\SVGADRV.BGI and mode 3 is used for 800x600 resolution, then use the following: set BGI=C:\TC\BGI set SVGA=SVGADRV.3 FIT_SCRIPT may be used to specify a `gnuplot` command to be executed when a fit is interrupted---see `fit`. FIT_LOG specifies the filename of the logfile maintained by fit. 2 Expressions ?expressions In general, any mathematical expression accepted by C, FORTRAN, Pascal, or BASIC is valid. The precedence of these operators is determined by the specifications of the C programming language. White space (spaces and tabs) is ignored inside expressions. Complex constants are expressed as {<real>,<imag>}, where <real> and <imag> must be numerical constants. For example, {3,2} represents 3 + 2i; {0,1} represents 'i' itself. The curly braces are explicitly required here. Note that gnuplot uses both "real" and "integer" arithmetic, like FORTRAN and C. Integers are entered as "1", "-10", etc; reals as "1.0", "-10.0", "1e1", 3.5e-1, etc. The most important difference between the two forms is in division: division of integers truncates: 5/2 = 2; division of reals does not: 5.0/2.0 = 2.5. In mixed expressions, integers are "promoted" to reals before evaluation: 5/2e0 = 2.5. The result of division of a negative integer by a positive one may vary among compilers. Try a test like "print -5/2" to determine if your system chooses -2 or -3 as the answer. The real and imaginary parts of complex expressions are always real, whatever the form in which they are entered: in {3,2} the "3" and "2" are reals, not integers. 3 Functions ?expressions functions ?functions The functions in `gnuplot` are the same as the corresponding functions in the Unix math library, except that all functions accept integer, real, and complex arguments, unless otherwise noted. For those functions that accept or return angles that may be given in either degrees or radians (sin(x), cos(x), tan(x), asin(x), acos(x), atan(x), atan2(x) and arg(z)), the unit may be selected by `set angles`, which defaults to radians. @start table #Function & Arguments & Returns \\ \hline %Function@Arguments@Returns %_ 4 abs ?expressions functions abs ?functions abs ?abs #abs(x) & any & absolute value of {\tt x}, $|x|$; same type \\ #abs(x) & complex & length of {\tt x}, $\sqrt{{\mbox{real}(x)^{2} + #\mbox{imag}(x)^{2}}}$ \\ %abs(x)@any@absolute value of x, $|x|$; same type %abs(x)@complex@length of x, $sqrt{roman real (x) sup 2 + roman imag (x) sup 2}$ The `abs` function returns the absolute value of its argument. The returned value is of the same type as the argument. For complex arguments, abs(x) is defined as the length of x in the complex plane [i.e., sqrt(real(x)**2 + imag(x)**2) ]. 4 acos ?expressions functions acos ?functions acos ?acos #acos(x) & any & $\cos^{-1} x$ (inverse cosine) \\ %acos(x)@any@$cos sup -1 x$ (inverse cosine) The `acos` function returns the arc cosine (inverse cosine) of its argument. `acos` returns its argument in radians or degrees, as selected by `set angles`. 4 acosh ?expressions functions acosh ?functions acosh ?acosh #acosh(x) & any & $\cosh^{-1} x$ (inverse hyperbolic cosine) in radians \\ %acosh(x)@any@$cosh sup -1 x$ (inverse hyperbolic cosine) in radians The `acosh` function returns the inverse hyperbolic cosine of its argument in radians. 4 arg ?expressions functions arg ?functions arg ?arg #arg(x) & complex & the phase of $x$ \\ %arg(x)@complex@the phase of $x$ The `arg` function returns the phase of a complex number in radians or degrees, as selected by `set angles`. 4 asin ?expressions functions asin ?functions asin ?asin #asin(x) & any & $\sin^{-1} x$ (inverse sin) \\ %asin(x)@any@$sin sup -1 x$ (inverse sin) The `asin` function returns the arc sin (inverse sin) of its argument. `asin` returns its argument in radians or degrees, as selected by `set angles`. 4 asinh ?expressions functions asinh ?functions asinh ?asinh #asinh(x) & any & $\sinh^{-1} x$ (inverse hyperbolic sin) in radians \\ %asinh(x)@any@$sinh sup -1 x$ (inverse hyperbolic sin) in radians The `asinh` function returns the inverse hyperbolic sin of its argument in radians. 4 atan ?expressions functions atan ?functions atan ?atan #atan(x) & any & $\tan^{-1} x$ (inverse tangent) \\ %atan(x)@any@$tan sup -1 x$ (inverse tangent) The `atan` function returns the arc tangent (inverse tangent) of its argument. `atan` returns its argument in radians or degrees, as selected by `set angles`. 4 atan2 ?expressions functions atan2 ?functions atan2 ?atan2 #atan2(y,x) & int or real & $\tan^{-1} (y/x)$ (inverse tangent) \\ %atan2(y,x)@int or real@$tan sup -1 (y/x)$ (inverse tangent) The `atan2` function returns the arc tangent (inverse tangent) of the ratio of the real parts of its arguments. `atan2` returns its argument in radians or degrees, as selected by `set angles`, in the correct quadrant. 4 atanh ?expressions functions atanh ?functions atanh ?atan #atanh(x) & any & $\tanh^{-1} x$ (inverse hyperbolic tangent) in radians \\ %atanh(x)@any@$tanh sup -1 x$ (inverse hyperbolic tangent) in radians The `atanh` function returns the inverse hyperbolic tangent of its argument in radians. 4 besj0 ?expressions functions besj0 ?functions besj0 ?besj0 #besj0(x) & int or real & $j_{0}$ Bessel function of $x$, in radians \\ %besj0(x)@int or real@$j sub 0$ Bessel function of $x$, in radians The `besj0` function returns the j0th Bessel function of its argument. `besj0` expects its argument to be in radians. 4 besj1 ?expressions functions besj1 ?functions besj1 ?besj1 #besj1(x) & int or real & $j_{1}$ Bessel function of $x$, in radians \\ %besj1(x)@int or real@$j sub 1$ Bessel function of $x$, in radians The `besj1` function returns the j1st Bessel function of its argument. `besj1` expects its argument to be in radians. 4 besy0 ?expressions functions besy0 ?functions besy0 ?besy0 #besy0(x) & int or real & $y_{0}$ Bessel function of $x$, in radians \\ %besy0(x)@int or real@$y sub 0$ Bessel function of $x$, in radians The `besy0` function returns the y0th Bessel function of its argument. `besy0` expects its argument to be in radians. 4 besy1 ?expressions functions besy1 ?functions besy1 ?besy1 #besy1(x) & int or real & $y_{1}$ Bessel function of $x$, in radians \\ %besy1(x)@int or real@$y sub 1$ Bessel function of $x$, in radians The `besy1` function returns the y1st Bessel function of its argument. `besy1` expects its argument to be in radians. 4 ceil ?expressions functions ceil ?functions ceil ?ceil #ceil(x) & any & $\lceil x \rceil$, smallest integer not less than $x$ #(real part) \\ %ceil(x)@any@$left ceiling x right ceiling$, smallest integer not less than $x$ (real part) The `ceil` function returns the smallest integer that is not less than its argument. For complex numbers, `ceil` returns the smallest integer not less than the real part of its argument. 4 cos ?expressions functions cos ?functions cos ?cos #cos(x) & any & $\cos x$, cosine of $x$ \\ %cos(x)@radians@$cos~x$, cosine of $x$ The `cos` function returns the cosine of its argument. `cos` accepts its argument in radians or degrees, as selected by `set angles`. 4 cosh ?expressions functions cosh ?functions cosh ?cosh #cosh(x) & any & $\cosh x$, hyperbolic cosine of $x$ in radians \\ %cosh(x)@any@$cosh~x$, hyperbolic cosine of $x$ in radians The `cosh` function returns the hyperbolic cosine of its argument. `cosh` expects its argument to be in radians. 4 erf ?expressions functions erf ?functions erf ?erf #erf(x) & any & $\mbox{Erf}(\mbox{real}(x))$, error function of real($x$) \\ %erf(x)@any@$erf ( roman real (x))$, error function of real ($x$) The `erf` function returns the error function of the real part of its argument. If the argument is a complex value, the imaginary component is ignored. 4 erfc ?expressions functions erfc ?functions erfc ?erfc #erfc(x) & any & $\mbox{Erfc}(\mbox{real}(x))$, 1.0 - error function of real($x$) \\ %erfc(x)@any@$erfc ( roman real (x))$, 1.0 - error function of real ($x$) The `erfc` function returns 1.0 - the error function of the real part of its argument. If the argument is a complex value, the imaginary component is ignored. 4 exp ?expressions functions exp ?functions exp ?exp #exp(x) & any & $e^{x}$, exponential function of $x$ \\ %exp(x)@any@$e sup x$, exponential function of $x$ The `exp` function returns the exponential function of its argument (`e` raised to the power of its argument). On some implementations (notably suns), exp(-x) returns undefined for very large x. A user-defined function like safe(x) = x<-100 ? 0 : exp(x) might prove useful in these cases. 4 floor ?expressions functions floor ?functions floor ?floor #floor(x) & any & $\lfloor x \rfloor$, largest integer not greater #than $x$ (real part) \\ %floor(x)@any@$left floor x right floor$, largest integer not greater than $x$ (real part) The `floor` function returns the largest integer not greater than its argument. For complex numbers, `floor` returns the largest integer not greater than the real part of its argument. 4 gamma ?expressions functions gamma ?functions gamma ?gamma #gamma(x) & any & $\mbox{Gamma}(\mbox{real}(x))$, gamma function of real($x$) \\ %gamma(x)@any@$GAMMA ( roman real (x))$, gamma function of real ($x$) The `gamma` function returns the gamma function of the real part of its argument. For integer n, gamma(n+1) = n!. If the argument is a complex value, the imaginary component is ignored. 4 ibeta ?expressions functions ibeta ?functions ibeta ?ibeta #ibeta(p,q,x) & any & $\mbox{Ibeta}(\mbox{real}(p,q,x))$, ibeta function of real($p$,$q$,$x$) \\ %ibeta(p,q,x)@any@$Ibeta ( roman real (p,q,x))$, ibeta function of real ($p$,$q$,$x$) The `ibeta` function returns the incomplete beta function of the real parts of its arguments. p, q > 0 and x in [0:1]. If the arguments are complex, the imaginary components are ignored. 4 inverf ?expressions functions inverf ?functions inverf ?inverf #inverf(x) & any & inverse error function of real($x$) \\ %inverf(x)@any@inverse error function real($x$) The `inverf` function returns the inverse error function of the real part of its argument. 4 igamma ?expressions functions igamma ?functions igamma ?igamma #igamma(a,x) & any & $\mbox{Igamma}(\mbox{real}(a,x))$, igamma function of real($a$,$x$) \\ %igamma(a,x)@any@$Igamma ( roman real (a,x))$, igamma function of real ($a$,$x$) The `igamma` function returns the incomplete gamma function of the real parts of its arguments. a > 0 and x >= 0. If the arguments are complex, the imaginary components are ignored. 4 imag ?expressions functions imag ?functions imag ?imag #imag(x) & complex & imaginary part of $x$ as a real number \\ %imag(x)@complex@imaginary part of $x$ as a real number The `imag` function returns the imaginary part of its argument as a real number. 4 invnorm ?expressions functions invnorm ?functions invnorm ?invnorm #invnorm(x) & any & inverse normal distribution function of real($x$) \\ %invnorm(x)@any@inverse normal distribution function real($x$) The `invnorm` function returns the inverse normal distribution function of the real part of its argument. 4 int ?expressions functions int ?functions int ?int #int(x) & real & integer part of $x$, truncated toward zero \\ %int(x)@real@integer part of $x$, truncated toward zero The `int` function returns the integer part of its argument, truncated toward zero. 4 lgamma ?expressions functions lgamma ?functions lgamma ?lgamma #lgamma(x) & any & $\mbox{Lgamma}(\mbox{real}(x))$, lgamma function of real($x$) \\ %lgamma(x)@any@$Lgamma ( roman real (x))$, lgamma function of real ($x$) The `lgamma` function returns the natural logarithm of the gamma function of the real part of its argument. If the argument is a complex value, the imaginary component is ignored. 4 log ?expressions functions log ?functions log ?log #log(x) & any & $\log_{e} x$, natural logarithm (base $e$) of $x$ \\ %log(x)@any@$ln~x$, natural logarithm (base $e$) of $x$ The `log` function returns the natural logarithm (base `e`) of its argument. 4 log10 ?expressions functions log10 ?functions log10 ?log10 #log10(x) & any & $\log_{10} x$, logarithm (base $10$) of $x$ \\ %log10(x)@any@${log sub 10}~x$, logarithm (base $10$) of $x$ The `log10` function returns the logarithm (base 10) of its argument. 4 norm ?expressions functions norm ?functions norm ?norm #norm(x) & any & normal distribution (Gaussian) function of real($x$) \\ %norm(x)@any@$norm(x)$, normal distribution function of real($x$) The `norm` function returns the normal distribution function (or Gaussian) of the real part of its argument. 4 rand ?expressions functions rand ?functions rand ?rand #rand(x) & any & $\mbox{Rand}(\mbox{real}(x))$, pseudo random number generator \\ %rand(x)@any@$rand ( roman real (x))$, pseudo random number generator The `rand` function returns a pseudo random number in the interval [0:1] using the real part of its argument as a seed. If seed < 0, the sequence is (re)initialized. If the argument is a complex value, the imaginary component is ignored. 4 real ?expressions functions real ?functions real ?real #real(x) & any & real part of $x$ \\ %real(x)@any@real part of $x$ The `real` function returns the real part of its argument. 4 sgn ?expressions functions sgn ?functions sgn ?sgn #sgn(x) & any & 1 if $x>0$, -1 if $x<0$, 0 if $x=0$. imag($x$) ignored \\ %sgn(x)@any@1 if $x > 0$, -1 if $x < 0$, 0 if $x = 0$. $roman imag (x)$ ignored The `sgn` function returns 1 if its argument is positive, -1 if its argument is negative, and 0 if its argument is 0. If the argument is a complex value, the imaginary component is ignored. 4 sin ?expressions functions sin ?functions sin ?sin #sin(x) & any & $\sin x$, sine of $x$ \\ %sin(x)@any@$sin~x$, sine of $x$ The `sin` function returns the sine of its argument. `sin` expects its argument to be in radians or degrees, as selected by `set angles`. 4 sinh ?expressions functions sinh ?functions sinh ?sinh #sinh(x) & any & $\sinh x$, hyperbolic sine $x$ in radians \\ %sinh(x)@any@$sinh~x$, hyperbolic sine $x$ in radians The `sinh` function returns the hyperbolic sine of its argument. `sinh` expects its argument to be in radians. 4 sqrt ?expressions functions sqrt ?functions sqrt ?sqrt #sqrt(x) & any & $\sqrt{x}$, square root of $x$ \\ %sqrt(x)@any@$sqrt x $, square root of $x$ The `sqrt` function returns the square root of its argument. 4 tan ?expressions functions tan ?functions tan ?tan #tan(x) & any & $\tan x$, tangent of $x$ \\ %tan(x)@any@$tan~x$, tangent of $x$ The `tan` function returns the tangent of its argument. `tan` expects its argument to be in radians or degrees, as selected by `set angles`. 4 tanh ?expressions functions tanh ?functions tanh ?tanh #tanh(x) & any & $\tanh x$, hyperbolic tangent of $x$ in radians\\ %tanh(x)@any@$tanh~x$, hyperbolic tangent of $x$ in radians The `tanh` function returns the hyperbolic tangent of its argument. `tanh` expects its argument to be in radians. @end table A few additional functions are also available. @start table #Function & Arguments & Returns \\ \hline %Function@Arguments@Returns %_ 4 column ?expressions functions column ?functions column ?column #column(x) & int & column $x$ during datafile manipulation. \\ %column(x)@int@ column $x$ during datafile manipulation. `column(x)` may be used only in expressions as part of `using` manipulations to fits or datafile plots. See `plot datafile using`. 4 tm_hour ?expressions tm_hour ?functions tm_hour #tm\_hour(x) & int & the hour \\ %tm_hour(x)@int@the hour The `tm_hour` function interprets its argument as a time, in seconds from 1 Jan 2000. It returns the hour (an integer in the range 0--23) as a real. 4 tm_mday ?expressions tm_mday ?functions tm_mday #tm\_mday(x) & int & the day of the month \\ %tm_mday(x)@int@the day of the month The `tm_mday` function interprets its argument as a time, in seconds from 1 Jan 2000. It returns the day of the month (an integer in the range 1--31) as a real. 4 tm_min ?expressions tm_min ?functions tm_min #tm\_min(x) & int & the minute \\ %tm_min(x)@int@the minute The `tm_min` function interprets its argument as a time, in seconds from 1 Jan 2000. It returns the minute (an integer in the range 0--59) as a real. 4 tm_mon ?expressions tm_mon ?functions tm_mon #tm\_mon(x) & int & the month \\ %tm_mon(x)@int@the month The `tm_mon` function interprets its argument as a time, in seconds from 1 Jan 2000. It returns the month (an integer in the range 1--12) as a real. 4 tm_sec ?expressions tm_sec ?functions tm_sec #tm\_sec(x) & int & the second \\ %tm_sec(x)@int@the second The `tm_sec` function interprets its argument as a time, in seconds from 1 Jan 2000. It returns the second (an integer in the range 0--59) as a real. 4 tm_wday ?expressions tm_wday ?functions tm_wday #tm\_wday(x) & int & the day of the week \\ %tm_wday(x)@int@the day of the week The `tm_wday` function interprets its argument as a time, in seconds from 1 Jan 2000. It returns the day of the week (an integer in the range 1--7) as a real. 4 tm_yday ?expressions tm_yday ?functions tm_yday #tm\_yday(x) & int & the day of the year \\ %tm_yday(x)@int@the day of the year The `tm_yday` function interprets its argument as a time, in seconds from 1 Jan 2000. It returns the day of the year (an integer in the range 1--366) as a real. 4 tm_year ?expressions tm_year ?functions tm_year #tm\_year(x) & int & the year \\ %tm_year(x)@int@the year The `tm_year` function interprets its argument as a time, in seconds from 1 Jan 2000. It returns the year (an integer) as a real. 4 valid ?expressions functions valid ?functions valid ?valid #valid(x) & int & test validity of $\mbox{column}(x)$ during datafile manip.\\ %valid(x)@int@ test validity of column($x$) during datafile manip. `valid(x)` may be used only in expressions as part of `using` manipulations to fits or datafile plots. See `plot datafile using`. @end table ^ <a href="http://www.nas.nasa.gov/~woo/gnuplot/airfoil/airfoil.html">Use of functions and complex variables for airfoils </a> 3 Operators ?expressions operators ?operators The operators in `gnuplot` are the same as the corresponding operators in the C programming language, except that all operators accept integer, real, and complex arguments, unless otherwise noted. The ** operator (exponentiation) is supported, as in FORTRAN. Parentheses may be used to change order of evaluation. 4 Unary ?expressions operators unary ?operators unary ?unary The following is a list of all the unary operators and their usages: @start table - first is interactive cleartext form Symbol Example Explanation - -a unary minus + +a unary plus (no-operation) ~ ~a * one's complement ! !a * logical negation ! a! * factorial $ $3 * call arg/column during `using` manipulation #\multicolumn{3}{|c|}{Unary Operators}\\ #Symbol & Example & Explanation \\ \hline #\verb@-@ & \verb@-a@ & unary minus \\ #\verb@+@ & \verb@+a@ & unary plus (no-operation) \\ #\verb@~@ & \verb@~a@ & * one's complement \\ #\verb@!@ & \verb@!a@ & * logical negation \\ #\verb@!@ & \verb@a!@ & * factorial \\ #\verb@$@ & \verb@$3@ & * call arg/column during `using` manipulation \\ C ugly hack: doc2ms uses $ as delimiter for eqn's so it doesn't seem to C be able to print them. So we have to typeset this table without using C eqn (at least that's the only solution I found, without any real docs C on *roff and eqn C First, terminate the table doc2ms.c already started: %.TE C ... then turn off eqn delimiters: %.EQ %delim off %.EN C ... and restart the table: %.TS %center box tab (@) ; %c c l . %Symbol@Example@Explanation %_ %-@-a@unary minus %+@+a@unary plus (no-operation) %~@~a@* one's complement %!@!a@* logical negation %!@a!@* factorial %$@$3@* call arg/column during `using` manipulation %_ @end table (*) Starred explanations indicate that the operator requires an integer argument. Operator precedence is the same as in Fortran and C. As in those languages, parentheses may be used to change the order of operation. Thus -2**2 = -4, but (-2)**2 = 4. The factorial operator returns a real number to allow a greater range. 4 Binary ?expressions operators binary ?operators binary ?binary The following is a list of all the binary operators and their usages: @start table - first is interactive cleartext form Symbol Example Explanation ** a**b exponentiation * a*b multiplication / a/b division % a%b * modulo + a+b addition - a-b subtraction == a==b equality != a!=b inequality < a<b less than <= a<=b less than or equal to > a>b greater than >= a>=b greater than or equal to & a&b * bitwise AND ^ a^b * bitwise exclusive OR | a|b * bitwise inclusive OR && a&&b * logical AND || a||b * logical OR #\multicolumn{3}{|c|}{Binary Operators} \\ #Symbol & Example & Explanation \\ \hline #\verb~**~ & \verb~a**b~ & exponentiation\\ #\verb~*~ & \verb~a*b~ & multiplication\\ #\verb~/~ & \verb~a/b~ & division\\ #\verb~%~ & \verb~a%b~ & * modulo\\ #\verb~+~ & \verb~a+b~ & addition\\ #\verb~-~ & \verb~a-b~ & subtraction\\ #\verb~==~ & \verb~a==b~ & equality\\ #\verb~!=~ & \verb~a!=b~ & inequality\\ #\verb~<~ & \verb~a<b~ & less than\\ #\verb~<=~ & \verb~a<=b~ & less than or equal to\\ #\verb~>~ & \verb~a>b~ & greater than\\ #\verb~>=~ & \verb~a>=b~ & greater than or equal to\\ #\verb~&~ & \verb~a&b~ & * bitwise AND\\ #\verb~^~ & \verb~a^b~ & * bitwise exclusive OR\\ #\verb~|~ & \verb~a|b~ & * bitwise inclusive OR\\ #\verb~&&~ & \verb~a&&b~ & * logical AND\\ #\verb~||~ & \verb~a||b~ & * logical OR\\ %Symbol@Example@Explanation %_ %**@a**b@exponentiation %*@a*b@multiplication %/@a/b@division %%@a%b@* modulo %+@a+b@addition %-@a-b@subtraction %==@a==b@equality %!=@a!=b@inequality %<@a<b@less than %<=@a<=b@less than or equal to %>@a>b@greater than %>=@a>=b@greater than or equal to %&@a&b@* bitwise AND %^@a^b@* bitwise exclusive OR %|@a|b@* bitwise inclusive OR %&&@a&&b@* logical AND %||@a||b@* logical OR @end table (*) Starred explanations indicate that the operator requires integer arguments. Logical AND (&&) and OR (||) short-circuit the way they do in C. That is, the second `&&` operand is not evaluated if the first is false; the second `||` operand is not evaluated if the first is true. 4 Ternary ?expressions operators ternary ?operators ternary ?ternary There is a single ternary operator: @start table - first is interactive cleartext form Symbol Example Explanation ?: a?b:c ternary operation #\multicolumn{3}{|c|}{Ternary Operator} \\ #Symbol & Example & Explanation \\ \hline #\verb~?:~ & \verb~a?b:c~ & ternary operation\\ %Symbol@Example@Explanation %_ %?:@a?b:c@* ternary operation @end table The ternary operator behaves as it does in C. The first argument (a), which must be an integer, is evaluated. If it is true (non-zero), the second argument (b) is evaluated and returned; otherwise the third argument (c) is evaluated and returned. The ternary operator is very useful both in constructing piecewise functions and in plotting points only when certain conditions are met. Examples: Plot a function that is to equal sin(x) for 0 <= x < 1, 1/x for 1 <= x < 2, and undefined elsewhere: f(x) = 0<=x && x<1 ? sin(x) : 1<=x && x<2 ? 1/x : 1/0 plot f(x) ^ <img align=bottom src="http://www.nas.nasa.gov/~woo/gnuplot/doc/ternary.gif" alt="[ternary.gif]" width=640 height=480> Note that `gnuplot` quietly ignores undefined values, so the final branch of the function (1/0) will produce no plottable points. Note also that f(x) will be plotted as a continuous function across the discontinuity if a line style is used. To plot it discontinuously, create separate functions for the two pieces. (Parametric functions are also useful for this purpose.) For data in a file, plot the average of the data in columns 2 and 3 against the datum in column 1, but only if the datum in column 4 is non-negative: plot 'file' using 1:( $4<0 ? 1/0 : ($2+$3)/2 ) Please see `plot data-file using` for an explanation of the `using` syntax. 3 User-defined ?expressions user-defined ?user-defined ?variables New user-defined variables and functions of one through five variables may be declared and used anywhere, including on the `plot` command itself. User-defined function syntax: <func-name>( <dummy1> {,<dummy2>} ... {,<dummy5>} ) = <expression> where <expression> is defined in terms of <dummy1> through <dummy5>. User-defined variable syntax: <variable-name> = <constant-expression> Examples: w = 2 q = floor(tan(pi/2 - 0.1)) f(x) = sin(w*x) sinc(x) = sin(pi*x)/(pi*x) delta(t) = (t == 0) ramp(t) = (t > 0) ? t : 0 min(a,b) = (a < b) ? a : b comb(n,k) = n!/(k!*(n-k)!) len3d(x,y,z) = sqrt(x*x+y*y+z*z) plot f(x) = sin(x*a), a = 0.2, f(x), a = 0.4, f(x) ^ <img align=bottom src="http://www.nas.nasa.gov/~woo/gnuplot/doc/userdefined.gif" alt="[userdefined.gif]" width=640 height=480> Note that the variable `pi` is already defined. But it is in no way magic; you may redefine it to be whatever you like. Valid names are the same as in most programming languages: they must begin with a letter, but subsequent characters may be letters, digits, "$", or "_". Note, however, that the `fit` mechanism uses several variables with names that begin "FIT_". It is safest to avoid using such names. "FIT_LIMIT", however, is one that you may wish to redefine. See `show functions` and `show variables`. 2 Glossary ?glossary Throughout this document an attempt has been made to maintain consistency of nomenclature. This cannot be wholly successful because as `gnuplot` has evolved over time, certain command and keyword names have been adopted that preclude such perfection. This section contains explanations of the way some of these terms are used. A "page" or "screen" is the entire area addressable by `gnuplot`. On a monitor, it is the full screen; on a plotter, it is a single sheet of paper. A screen may contain one or more "plots". A plot is defined by an abscissa and an ordinate, although these need not actually appear on it, as well as the margins and any text written therein. A plot contains one "graph". A graph is defined by an abscissa and an ordinate, although these need not actually appear on it. A graph may contain one or more "lines". A line is a single function or data set. "Line" is also a plotting style. The word will also be used in sense "a line of text". Presumably the context will always remove the ambiguity. The lines on a graph may have individual names. These may be listed together with a sample of the plotting style used to represent them in the "key", sometimes also called the "legend". The word "title" occurs with multiple meanings in `gnuplot`. In this document, it will always be preceded by the adjective "plot", "line", or "key" to differentiate among them. A graph may have up to four labelled axes. Various commands have the name of an axis built into their names, such as `set xlabel`. Other commands have one or more axis names as options, such as `set logscale xy`. The names of the four axes for these usages are "x" for the axis along the bottom border of the plot, "y" for the left border, "x2" for the top border, and "y2" for the right border. "z" also occurs in commands used with 3-d plotting. When discussing data files, the term "record" will be resurrected and used to denote a single line in the file, that is, the characters between newline or end-of-record characters. A "point" is the datum on a single record, and a "dataline" is a set of points on consecutive records, delimited by blank records. 2 Plotting ?plotting There are three `gnuplot` commands which actually create a plot: `plot`, `splot` and `replot`. `plot` generates 2-d plots, `splot` generates 3-d plots (actually 2-d projections, of course), and `replot` appends its arguments to the previous `plot` or `splot` and executes the modified command. Much of the general information about plotting can be found in the discussion of `plot`; information specific to 3-d can be found in the `splot` section. `plot` operates in either rectangular or polar coordinates -- see `set polar` for details of the latter. `splot` operates only in rectangular coordinates, but the `set mapping` command allows for a few other coordinate systems to be treated. In addition, the `using` option allows both `plot` and `splot` to treat almost any coordinate system you'd care to define. `splot` can plot surfaces and contours in addition to lines. See `splot datafile` for information about the requisite file structure for both of these; see `set isosamples` for information about defining the grid for a 3-d function. See `set contour` and `set cntrparam` for information about contours. 2 Start-up ?startup ?start ?.gnuplot When `gnuplot` is run, it looks for an initialization file to load. This file is called `.gnuplot` on Unix and AmigaDOS systems, and `GNUPLOT.INI` on other systems. If this file is not found in the current directory, the program will look for it in the home directory (under AmigaDOS, Atari(single)TOS, MS-DOS and OS/2, the environment variable `gnuplot` should contain the name of this directory). Note: if NOCWDRC is defined during the installation, `gnuplot` will not read from the current directory. If the initialization file is found, `gnuplot` executes the commands in it. These may be any legal `gnuplot` commands, but typically they are limited to setting the terminal and defining frequently-used functions or variables. 2 Substitution ?substitution Command-line substitution is specified by a system command enclosed in backquotes. This command is spawned and the output it produces replaces the name of the command (and backquotes) on the command line. Newlines in the output produced by the spawned command are replaced with blanks. Command-line substitution can be used anywhere on the `gnuplot` command line. Example: This will run the program `leastsq` and replace `leastsq` (including backquotes) on the command line with its output: f(x) = `leastsq` or, in VMS f(x) = `run leastsq` 2 Syntax ?syntax ?specify ?punctuation The general rules of syntax and punctuation in `gnuplot` are that keywords and options are order-dependent. Options and any accompanying parameters are separated by spaces whereas lists and coordinates are separated by commas. Ranges are separated by colons and enclosed in braces [], text and file names are enclosed in quotes, and a few miscellaneous things are enclosed in parentheses. Brackets {} are used for a few special purposes. Commas are used to separate coordinates on the `set` commands `arrow`, `key`, and `label`; the list of variables being fitted (the list after the `via` keyword on the `fit` command); lists of discrete contours or the loop parameters which specify them on the `set cntrparam` command; the arguments of the `set` commands `dgrid3d`, `dummy`, `isosamples`, `offsets`, `origin`, `samples`, `size`, `time`, and `view`; lists of tics or the loop parameters which specify them; the offsets for titles and axis labels; parametric functions to be used to calculate the x, y, and z coordinates on the `plot`, `replot` and `splot` commands; and the complete sets of keywords specifying individual plots (data sets or functions) on the `plot`, `replot` and `splot` commands. Parentheses are used to delimit sets of explicit tics (as opposed to loop parameters) and to indicate computations in the `using` filter of the `fit`, `plot`, `replot` and `splot` commands. (Parentheses and commas are also used as usual in function notation.) Braces are used to delimit ranges, whether they are given on `set`, `plot` or `splot` commands. Colons are used to separate extrema in `range` specifications (whether they are given on `set`, `plot` or `splot` commands) and to separate entries in the `using` filter of the `plot`, `replot`, `splot` and `fit` commands. Semicolons are used to separate commands given on a single command line. Brackets are used in text to be specially processed by some terminals, like `postscript`. They are also used to denote complex numbers: {3,2} = 3 + 2i. Text may be enclosed in single- or double-quotes. Backslash processing of sequences like \n (newline) and \345 (octal character code) is performed for double-quoted strings, but not for single-quoted strings. The justification is the same for each line of a multi-line string. Thus the center-justified string "This is the first line of text.\nThis is the second line." will produce This is the first line of text. This is the second line. but 'This is the first line of text.\nThis is the second line.' will produce This is the first line of text.\nThis is the second line. At present you should not embed \n inside {} when using the enhanced option of the postscript terminal. The EEPIC, Imagen, Uniplex, LaTeX, and TPIC drivers allow a newline to be specified by \\ in a single-quoted string or \\\\ in a double-quoted string. Back-quotes are used to enclose system commands for substitution. 2 Time/Date data ?time/date `gnuplot` supports the use of time and/or date information as input data. This feature is activated by the commands `set xdata time`, `set ydata time`, etc. Internally all times and dates are converted to the number of seconds from the year 2000. The command `set timefmt` defines the format for all inputs: data files, ranges, tics, label positions---in short, anything that accepts a data value must receive it in this format. Since only one input format can be in force at a given time, all time/date quantities being input at the same time must be presented in the same format. Thus if both x and y data in a file are time/date, they must be in the same format. Commands like `show xrange` will re-interpret the integer according to `timefmt`. If you change `timefmt`, and then `show` the quantity again, it will be displayed in the new `timefmt`. For that matter, if you give the deactivation command (like `set xdata`), the quantity will be shown in its numerical form. The command `set format` defines the format that will be used for tic labels, whether or not the specified axis is time/date. If time/date information is to be plotted from a file, the `using` option _must_ be used on the `plot` or `splot` command. These commands simply use white space to separate columns, but white space may be embedded within the time/date string. If you use tabs as a separator, some trial-and-error may be necessary to discover how your system treats them. The following example demonstrates time/date plotting. Suppose the file "data" contains records like 03/21/95 10:00 6.02e23 This file can be plotted by set xdata time set timefmt "%m/%d" set xrange ["03/21":"03/22"] set format x "%m/%d" set timefmt "%m/%d/%y %H:%M" plot "data" using 1:3 which will produce xtic labels that look like "03/21". See the descriptions of each command for more details. 1 Commands ?commands 2 cd ?cd The `cd` command changes the working directory. Syntax: cd '<directory-name>' The directory name must be enclosed in quotes. Examples: cd 'subdir' cd ".." DOS users _must_ use single-quotes---backslash [\] has special significance inside double-quotes. For example, cd "c:\newdata" fails, but cd 'c:\newdata' works as expected. 2 call ?call The `call` command is identical to the load command with one exception: you can have up to ten additional parameters to the command (delimited according to the standard parser rules) which can be substituted into the lines read from the file. As each line is read from the `call`ed input file, it is scanned for the sequence `$` (dollar-sign) followed by a digit (0--9). If found, the sequence is replaced by the corresponding parameter from the `call` command line. If the parameter was specified as a string in the `call` line, it is substituted without its enclosing quotes. `$` followed by any character other than a digit will be that character. E.g. use `$$` to get a single `$`. Providing more than ten parameters on the `call` command line will cause an error. A parameter that was not provided substitutes as nothing. Files being `call`ed may themselves contain `call` or `load` commands. The `call` command _must_ be the last command on a multi-command line. Syntax: call "<input-file>" <parameter-0> <parm-1> ... <parm-9> The name of the input file must be enclosed in quotes, and it is recommended that parameters are similarly enclosed in quotes (future versions of gnuplot may treat quoted and unquoted arguments differently). Example: If the file 'calltest.gp' contains the line: print "p0=$0 p1=$1 p2=$2 p3=$3 p4=$4 p5=$5 p6=$6 p7=x$7x" entering the command: call 'calltest.gp' "abcd" 1.2 + "'quoted'" -- "$2" will display: p0=abcd p1=1.2 p2=+ p3='quoted' p4=- p5=- p6=$2 p7=xx NOTE: there is a clash in syntax with the datafile `using` callback operator. Use `$$n` or `column(n)` to access column n from a datafile inside a `call`ed datafile plot. 2 clear ?clear The `clear` command erases the current screen or output device as specified by `set output`. This usually generates a formfeed on hardcopy devices. Use `set terminal` to set the device type. For some terminals `clear` erases only the portion of the plotting surface defined by `set size`, so for these it can be used in conjunction with `set multiplot` to create an inset. Example: set multiplot plot sin(x) set origin 0.5,0.5 set size 0.4,0.4 clear plot cos(x) set nomultiplot Please see `set multiplot`, `set size`, and `set origin` for details of these commands. 2 exit ?exit ?quit The commands `exit` and `quit` and the END-OF-FILE character will exit `gnuplot`. Each of these commands will clear the output device (as does the `clear` command) before exiting. 2 fit ?fit This implementation incorporates the capability of nonlinear least squares fitting using the Marquardt-Levenberg Algorithm. It may fit any user-defined function to any set of data points (x,y) or (x,y,z). x, y, z and the function's return type _must_ be real! Any variable occurring in the function body may serve as a fit parameter (fitting functions without adjustable parameters make no sense). Syntax: fit {[xrange]} {[yrange]} <function> '<datafile>' {datafile-modifiers} via {'<parameter file>' | <var1>,<var2>,...} Notice that `via` is now a required keyword, to distinguish it from a 'scanf' format string. [xrange] and [yrange] are of the form [{variable=}{<min>}{:<max>}], allowing the range of the fit to be limited temporarily in a manner analogous to `plot`. <function> is any valid `gnuplot` expression, although it is usual to use a previously user-defined function of the form f(x) or f(x,y). <datafile> is treated as in the `plot` command. All the modifiers for datafiles (`using`, `every`,...) in `plot` are available here (except `smooth`)---see `plot datafile` for full details. The default columns for x and y are 1 and 2. These may be changed by the `using x:y` mechanism. If `using` has a third entry (a column or an expression), it will be interpreted as the standard deviation of each y value and will be used to compute the weight; otherwise all data will be weighted equally. If four columns are specified, they are x:y:z:error---note that an error _must_ be specified in order to perform a 3-d fit. If errors are not available, a constant value can be specified, e.g., `using ...:(1)`. Initial values for the parameters to be fit may be specified in a (load-)file wherein each line is of the form: varname = value Comments, marked by '#', and blank lines are permissible. The special form varname = value # FIXED means that the variable is treated as a `fixed parameter` that is initialized but will not be adjusted. It is not necessary (but sometimes useful for clarity) to specify them at all. The keyword `# FIXED` has to appear in exactly this form. The other means of specifying the adjustable parameters is to provide a comma-separated list of variable names after the `via` keyword. If any of these variables do not yet exist within the current `gnuplot` session, they are created with an initial value of 1.0, but the fit is more likely to converge if a more appropriate starting value is given. If this form is used, it may prove beneficial to iterate the fit, allowing only one or two variables to be adjusted at a time until a reasonably close fit is obtained, before allowing `fit` to vary all parameters. After each iteration step, detailed information is given about the fit's state, both on the screen and on a logfile "fit.log". This file will never be erased but always appended to so that the fit's history isn't lost. After each iteration step, the fit may be interrupted by pressing Ctrl-C (any key _but_ Ctrl-C under MSDOS and Atari Multitasking Systems). Then you have the options of stopping (and accepting the current parameter values), continuing the iteration of the fit, or executing a `gnuplot` command specified by an environment variable FIT_SCRIPT. A `plot` or `load` command may be useful in this context. Special `gnuplot` variables: FIT_LIMIT may be specified to change the default epsilon limit (1e-5). When the sum of squared residuals changes between two iteration steps by less than a factor of this number, the fit is considered to have 'converged'. Once the fit is converged, the final values may be stored in (load-)file suitable for use as an initial-value file, as discussed above. Please see `update` for details. FIT_MAXITER may be specified to limit the number of iterations performed without convergence by FIT_LIMIT. A value of 0 (or not defining it at all) means that there is no limit. [FIT_SKIP was available in previous releases of gnufit. Its functionality is now obtained using the `every` modifier for datafiles. FIT_INDEX was previously available in order to allow multi-branch fitting. Multi-branch fitting in 2-d can now be done as a pseudo-3-d fit in which the y values are the dataline number (`using 1:-1:...`) or index (`using 1:-2:...`).] Environment variables: FIT_LOG changes the logfile's path from './fit.log' (write permission is necessary). FIT_SCRIPT specifies a command to be executed after an user interrupt. Examples: f(x) = a*x**2 + b*x + c FIT_LIMIT = 1e-6 fit f(x) 'measured.dat' via 'start.par' fit f(x) 'measured.dat' using 3:($7-5) via 'start.par' fit f(x) './data/trash.dat' using 1:2:3 via a, b, c fit f(x,y) 'surface.dat' using 1:2:3:(1) via a, b, c ^ <a href="http://www.nas.nasa.gov/~woo/gnuplot/fit/fit.html"> See the `fit` demos. </a> 3 Introduction To Fitting ?fit introduction Beginner's guide to fitting in general `fit` is used to find a set of parameters to be used in a parametric function to make it fit to your data optimally. The quantity to be minimized is the sum of squared differences between your input data points and the function values at the same places, usually called 'chisquared' (i.e. the Greek letter chi, to the power of 2). (To be precise, the differences will be divided by the input data errors before being squared; see `fit errors` for details.) Now that you know why it's called 'least squares fitting', let's see why it's 'nonlinear'. That's because the function's dependence on the parameters (not the data!) may be non-linear. Of course, this might not tell you much if you didn't know already, so let me try to describe it. If the fitting problem were to be linear, the target function would have to be a sum of simple, non-parametric functions, each multiplied by one parameter. (For example, consider the function f(x) = c*sin(x), where we want to find the best value for the constant c. This is nonlinear in x, of course, but it is linear in c. Since the fitting procedure solves for c, it has a linear equation to solve.) For such a linear case, the task of fitting can be performed by comparatively simple linear algebra in one direct step. But `fit` can do more for you: the parameters may be used in your function in any way you can imagine. To handle this more general case, however, it has to perform an iteration, i.e. it will repeat a sequence of steps until it finds the fit to have 'converged', or until you stop it. Generally, the function to be fitted will come from some kind of theory (some prefer the term 'model' here) that makes a prediction about how the data should behave, and `fit` is then used to find the free parameters of the theory. This is a typical task in scientific work, where you have lots of data that depend in more or less complicated ways on the values you're interested in. The results will then usually be of the form 'the measured data can be described by the {foo} theory, for the following set of parameters', and then a set of values is given, together with the errors of your determination of these values. This reasoning implies that `fit` is probably _not_ your tool of choice if all you really want is a smooth line through your data points. If you want this, the `smooth` option to `plot` is what you've been looking for, not `fit`. See `plot datafile smooth` for details. 3 Errors In Fitting ?fit errors One of the most important things to keep in mind when using `fit` is the handling of errors. Here, this term refers to the measurement errors accompanying both your input data and resulting parameters. The reason for the importance of input data errors to fitting is that normally the single measurements aren't all of the same quality, so they shouldn't have the same importance in determining the results. That's one major reason for dividing the differences between data and function by the input errors, also known as 'weighting', in the computation of chisquared. By weighting, deviations from your function at places where the data have large errors will have a smaller part in chisquared, as the division will make them smaller compared to the better measurements. Another reason for the division is that, for mathematical reasons, chisquared has to be a dimensionless variable, i.e. chisquared should be something like '15.3', not '15.3 square seconds'. Without input data errors being given, all data will be weighted equally, and the resulting errors of the parameters won't have much of a real meaning. Therefore, you should always try to find a sensible set of y-errors for your data. An important example is that of data representing a histogram. In such a case, the square root of the y value is often the correct input error to use. Once the fit iteration has stopped, it will display a load of valuable information which you will have to learn to interpret before you can use it. The 'sum of squares residuals' is the distance between the data and your fit function, shortly called 'chisquared'. This is what `fit` tries to minimize. To quickly test if your fit went well, check that this is about the same as the number of data points minus the number of parameters (all this is only valid if you supplied y-errors, and the number of data points is large enough). For details on this, look up the 'Chi-squared distribution' in your favourite statistics textbook. If chisquared is much larger than that, then your function didn't fit the data very well. Try another, more general one, or allow more of the parameters to be adjusted by `fit`. Another possible reason could be that the y-errors you supplied were a bit optimistic, i.e. too small. If, on the other hand, chisquared is too small, then the function fit the data _too_ well. Either the given y-errors were too large, or the function is too general. You should try to restrict it by either fixing some parameters, or just make it simpler one way or the other. If all else went well, you'll see a list of the resulting parameter values, together with estimates of the errors of these values. And you should always be aware of this: they're _estimates_, not more. You'll have to get used to both `fit` and kind of problems you usually apply it to before you can use these errors for anything serious. To start with, the errors reported by `fit` are insensitive to the global scale of the y-errors, i.e. if you multiply all y-errors by a constant, the resulting parameter errors don't change. And, to repeat this once more: if you didn't supply y-errors, the parameter errors will normally be meaningless. 3 Tips and Tricks ?fit tips Here are some tips to keep in mind to get the most out of `fit`. They're not very organized, so you'll have to read them several times until their essence has sunk in. The two forms of the `via` argument to `fit` serve two largely distinct purposes. The `via "file"` form is best used for batch operation (possibly unattended), where you just supply the startup values in a file and perhaps later use `update` to copy the results back into another file (or the same one). The `via var1, var2, ...` form is best used interactively. Using the command history mechanism built into gnuplot, you can easily edit the list of parameters to be fitted or supply new startup values for the next try. This is particularly useful for hard problems, where a direct fit to all the parameters at once won't work, at least not without really _good_ values to start with. To find such a set of good starting parameters, you can iterate several times, fitting only some of the parameters each time, until the values are close enough to the goal that the final fit (to all the parameters at once) will work. A general word about starting values: `fit` may, and often will, get really badly lost in searching for the optimal parameter set if you start it way off any possible solution. The main reason for this is that nonlinear fitting is not guaranteed to converge to a global optimum. It can get stuck in a local optimum, and there's no way for the routine to find out about that. You'll have to use your own judgement in checking whether this has happened to you or not. To partly avoid that problem, you should put all starting values at least roughly into the vicinity of the solution. At least the order of magnitude should be correct, if possible. The better your starting values are, the less error-prone the fit. A good way to find starting values is to draw data and fit-function into one plot, and iterate, changing the values and `replot`-ting until reasonable similarity is reached. The same plot is also useful to check if the fit got stuck in a non-global minimum. Make sure that there is no mutual dependency among parameters of the function you are fitting. E.g., don't try to fit a*exp(x+b), because a*exp(x+b) = a*exp(b)*exp(x). Instead, fit either a*exp(x) or exp(x+b). A technical issue: the parameters must not be too different in magnitude. The larger the quotient of the largest and the smallest absolute parameter values, the slower the fit will converge. If the quotient is close to or above the inverse of the machine floating point precision, it may take next to forever to converge, or refuse to converge at all. You'll have to adapt your function to avoid this, e.g. replace 'parameter' by '1e9*parameter' in the function definition, and divide the starting value by 1e9. If you can write your function as a linear combination of simple functions weighted by the parameters to be fitted, by all means do so. That helps a lot, because the problem is then not nonlinear any more. It should take only a really small number of iterations to converge on a linear case, maybe even only one. In prescriptions for analysing data from practical experimentation courses, you'll often find descriptions how to first fit your data to some functions, maybe in a multi-step process accounting for several aspects of the underlying theory one by one, and then extract the data you really wanted from the fitting parameters of that function. With `fit`, this last step can often be eliminated by rewriting the model function to directly use the desired final parameters. Transforming data can also be avoided quite often, although sometimes at the cost of a harder fit problem. If you think this contradicts the previous paragraph about keeping the fit function as simple as possible, you're correct. Finally, a nice quote from the manual of another fitting package (fudgit) that kind of summarizes all these issues: "Nonlinear fitting is an art!" 2 help ?help The `help` command displays on-line help. To specify information on a particular topic use the syntax: help {<topic>} If <topic> is not specified, a short message is printed about `gnuplot`. After help for the requested topic is given, a menu of subtopics is given; help for a subtopic may be requested by typing its name, extending the help request. After that subtopic has been printed, the request may be extended again or you may go back one level to the previous topic. Eventually, the `gnuplot` command line will return. If a question mark (?) is given as the topic, the list of topics currently available is printed on the screen. 2 if ?if The `if` command allows commands to be executed conditionally. Syntax: if (<condition>) <command-line> <condition> will be evaluated. If it is true (non-zero), then the command(s) of the <command-line> will be executed. If <condition> is false (zero), then the entire <command-line> is ignored. Note that use of `;` to allow multiple commands on the same line will _not_ end the conditionalized commands. Examples: pi=3 if (pi!=acos(-1)) print "?Fixing pi!"; pi=acos(-1); print pi will display: ?Fixing pi! 3.14159265358979 but if (1==2) print "Never see this"; print "Or this either" will not display anything. See `reread` for an example of how `if` and `reread` can be used together to perform a loop. 2 load ?load The `load` command executes each line of the specified input file as if it had been typed in interactively. Files created by the `save` command can later be `load`ed. Any text file containing valid commands can be created and then executed by the `load` command. Files being `load`ed may themselves contain `load` or `call` commands. See `comment` for information about comments in commands. The `load` command _must_ be the last command on a multi-command line. Syntax: load "<input-file>" The name of the input file must be enclosed in quotes. Examples: load 'work.gnu' load "func.dat" The `load` command is performed implicitly on any file names given as arguments to `gnuplot`. These are loaded in the order specified, and then `gnuplot` exits. See also `call`. 2 pause ?pause The `pause` command displays any text associated with the command and then waits a specified amount of time or until the carriage return is pressed. `pause` is especially useful in conjunction with `load` files. Syntax: pause <time> {"<string>"} <time> may be any integer constant or expression. Choosing -1 will wait until a carriage return is hit, zero (0) won't pause at all, and a positive integer will wait the specified number of seconds. `pause 0` is synonymous with `print`. Note: Since `pause` communicates with the operating system rather than the graphics, it may behave differently with different device drivers (depending upon how text and graphics are mixed). Examples: pause -1 # Wait until a carriage return is hit pause 3 # Wait three seconds pause -1 "Hit return to continue" pause 10 "Isn't this pretty? It's a cubic spline." 2 plot ?plot `plot` is the primary command for drawing plots with `gnuplot`. It creates plots of functions and data in many, many ways. `plot` is used to draw 2-d functions and data; `splot` draws 2-d projections of 3-d surfaces and data. `plot` and `splot` contain many common features; see `splot` for differences. Syntax: plot {<ranges>} {<function> | {"<datafile>" {datafile-modifiers}}} {axes <axes>} {<title-spec>} {with <style>} {, {definitions,} <function> ...} where either a <function> or the name of a data file enclosed in quotes is supplied. A function is a mathematical expression or a pair of mathematical expressions in parametric mode. The expressions may be defined completely or in part earlier in the stream of `gnuplot` commands (see `user-defined`). It is also possible to define functions and parameters on the `plot` command itself. This is done merely by isolating them from other items with commas. There are four possible sets of axes available; the keyword <axes> is used to select the axes for which a particular line should be scaled. `x1y1` refers to the axes on the bottom and left; `x2y2` to those on the top and right; `x1y2` to those on the bottom and right; and `x2y1` to those on the top and left. Ranges specified on the `plot` command apply only to the first set of axes (bottom left). Examples: plot sin(x) plot f(x) = sin(x*a), a = .2, f(x), a = .4, f(x) plot [t=1:10] [-pi:pi*2] tan(t), \ "data.1" using (tan($2)):($3/$4) smooth csplines \ axes x1y2 notitle with lines 5 3 data-file ?plot data-file ?plot datafile ?data-file ?datafile ?data Discrete data contained in a file can be displayed by specifying the name of the data file (enclosed in quotes) on the `plot` or `splot` command line. Syntax: {s}plot '<file_name>' {index <index list>} {every <every list>} {thru <thru expression>} {using <using list>} {smooth <option>} The modifiers `index`, `every`, `thru`, `using`, and `smooth` are discussed separately. In brief, `index` selects which data sets in a multi-data-set file are to be plotted, `every` specifies which points within a single data set are to be plotted, `using` determines how the columns within a single record are to be interpreted (`thru` is a special case of `using`), and `smooth` allows for simple interpolation and approximation. Data files should contain one data point per record. Records beginning with # (or ! on VMS) will be treated as comments and ignored. Each data point represents an (x,y) pair. For `plot`s with error bars (see `set style errorbars`), each data point is (x,y,ydelta), (x,y,ylow,yhigh), (x,y,xdelta), (x,y,xlow,xhigh), or (x,y,xlow,xhigh,ylow,yhigh). In all cases, the numbers on each record of a data file must be separated by white space (one or more blanks or tabs), unless a format specifier is provided by the `using` option. This white space divides each record into columns. Data may be written in exponential format with the exponent preceded by the letter e, E, d, D, q, or Q. Only one column (the y value) need be provided. If x is omitted, `gnuplot` provides integer values starting at 0. In datafiles, blank records (records with no characters other than blanks and a newline and/or carriage return) are significant---pairs of blank records separate `index`es (see `plot datafile index`). Data separated by double blank records are treated as if they were in separate data files. Single blank records designate discontinuities in a `plot`; no line will join points separated by a blank records (if they are plotted with a line style). If autoscaling has been enabled (`set autoscale`), the axes are automatically extended to include all datapoints, with a whole number of tic marks if tics are being drawn. This has two consequences: i) For `splot`, the corner of the surface may not coincide with the corner of the base. In this case, no vertical line is drawn. ii) When plotting data with the same x range on a dual-axis graph, the x coordinates may not coincide if the x2tics are not being drawn. This is because the x axis has been autoextended to a whole number of tics, but the x2 axis has not. The following example illustrates the problem: reset; plot '-', '-' 1 1 19 19 e 1 1 19 19 e 4 every ?plot data-file every ?plot datafile every ?plot every ?data-file every ?datafile every ?every The `every` keyword allows a periodic sampling of a data set to be plotted. In the discussion a "point" is a datum defined by a single record in the file. Syntax: plot 'file' every {<point_incr>} {:{<line_incr>} {:{<start_point>} {:{<start_line>} {:{<end_point>} {:<end_line>}}}}} The data points to be plotted are selected according to a loop from <`start_point`> to <`end_point`> with increment <`point_incr`> and the datalines according to a loop from <`start_line`> to <`end_line`> with increment <`line_incr`>. The first datum in each dataline is numbered '0', as is the first dataline in the file. Note that records containing unplottable information are counted. Any of the numbers can be omitted; the increments default to unity, the start values to the first point or dataline, and the end values to the last point or dataline. If `every` is not specified, all points in all datalines are plotted. Examples: every :::3::3 # selects just the fourth dataline ('0' is first) every :::::9 # selects the first 10 datalines every 2:2 # selects every other point in every other dataline every ::5::15 # selects points 5 through 15 in each dataline ^ <a href="http://www.nas.nasa.gov/~woo/gnuplot/simple/simple.html">Simple Plot Demos </a>, ^ <a href="http://www.nas.nasa.gov/~woo/gnuplot/surfacea/surfacea.html">Non-parametric splot demos </a>, and ^ <a href="http://www.nas.nasa.gov/~woo/gnuplot/surfaceb/surfaceb.html">Parametric splot demos.</a> 4 example datafile ?plot data-file example ?plot datafile example ?plot example ?datafile example ?data-file example ?example This example compares the data in the file population.dat to a theoretical curve: pop(x) = 103*exp((1965-x)/10) plot [1960:1990] 'population.dat', pop(x) The file "population.dat" might contain: # Gnu population in Antarctica since 1965 1965 103 1970 55 1975 34 1980 24 1985 10 ^ <img align=bottom src="http://www.nas.nasa.gov/~woo/gnuplot/doc/population.gif" alt="[population.gif]" width=640 height=480> 4 index ?plot data-file index ?plot datafile index ?plot index ?data-file index ?datafile index ?index The `index` keyword allows only some of the data sets in a multi-data-set file to be plotted. Syntax: plot 'file' index <m>{{:<n>}:<p>} Data sets are separated by pairs of blank records. `index <m>` selects only set <m>; `index <m>:<n>` selects sets in the range <m> to <n>; and `index <m>:<n>:<p>` selects indices <m>, <m>+<p>, <m>+2<p>, etc., but stopping at <n>. Following C indexing, the index 0 is assigned to the first data set in the file. Specifying too large an index results in an error message. If `index` is not specified, all sets are plotted as a single data set. Example: plot 'file' index 4:5 ^ <a href="http://www.nas.nasa.gov/~woo/gnuplot/multimsh/multimsh.html"> splot with indices demo. </a> 4 smooth ?plot data-file smooth ?plot datafile smooth ?plot smooth ?data-file smooth ?datafile smooth ?smooth `gnuplot` includes a few general-purpose routines for interpolation and approximation of data; these are grouped under the `smooth` option. More sophisticated data processing may be performed by preprocessing the data externally or by using `fit` with an appropriate model. Syntax: smooth {unique | csplines | acsplines | bezier | sbezier} `unique` plots the data after making them monotonic. Each of the other routines uses the data to determine the coefficients of a continuous curve between the endpoints of the data. This curve is then plotted in the same manner as a function, that is, by finding its value at uniform intervals along the abscissa (see `set samples`) and connecting these points with straight line segments (if a line style is chosen). If `autoscale` is in effect, the ranges will be computed such that the plotted curve lies within the borders of the graph. If too few points are available to allow the selected option to be applied, an error message is produced. The minimum number is one for `unique`, four for `acsplines`, and three for the others. The `smooth` options have no effect on function plots. 5 acsplines ?plot data-file smooth acsplines ?plot datafile smooth acsplines ?data-file smooth acsplines ?datafile smooth acsplines ?plot smooth acsplines ?plot acsplines ?smooth acsplines ?acsplines `acsplines` approximates the data with a "natural smoothing spline". After the data are made monotonic in x (see `smooth unique`), a curve is piecewise constructed from segments of cubic polynomials whose coefficients are found by the weighting the data points; the weights are taken from the third column in the data file. That default can be modified by the third entry in the `using` list, e.g., plot 'data-file' using 1:2:(1.0) smooth acsplines Qualitatively, the absolute magnitude of the weights determines the number of segments used to construct the curve. If the weights are large, the effect of each datum is large and the curve approaches that produced by connecting consecutive points with natural cubic splines. If the weights are small, the curve is composed of fewer segments and thus is smoother; the limiting case is the single segment produced by a weighted linear least squares fit to all the data. The smoothing weight can be expressed in terms of errors as a statistical weight for a point divided by a "smoothing factor" for the curve so that (standard) errors in the file can be used as smoothing weights. Example: sw(x,S)=1/(x*x*S) plot 'data_file' using 1:2:(sw($3,100)) smooth acsplines 5 bezier ?plot data-file smooth bezier ?plot datafile smooth bezier ?plot smooth bezier ?data-file smooth bezier ?dat-file smooth bezier ?plot bezier ?smooth bezier ?bezier The `bezier` option approximates the data with a Bezier curve of degree n (the number of data points) that connects the endpoints. 5 csplines ?plot data-file smooth csplines ?plot datafile smooth csplines ?plot smooth csplines ?data-file smooth csplines ?datafile smooth csplines ?plot csplines ?smooth csplines ?csplines The `csplines` option connects consecutive points by natural cubic splines after rendering the data monotonic (see `smooth unique`). 5 sbezier ?plot data-file smooth sbezier ?plot datafile smooth sbezier ?plot smooth sbezier ?data-file smooth sbezier ?datafile smooth sbezier ?plot sbezier ?smooth sbezier ?sbezier The `sbezier` option first renders the data monotonic (`unique`) and then applies the `bezier` algorithm. 5 unique ?plot data-file smooth unique ?plot datafile smooth unique ?plot smooth unique ?data-file smooth unique ?datafile smooth unique ?plot unique ?smooth unique ?unique The `unique` option makes the data monotonic in x; points with the same x-value are replaced by a single point having the average y-value. The resulting points are then connected by straight line segments. ^ <a href="http://www.nas.nasa.gov/~woo/gnuplot/mgr/mgr.html"> See demos. </a> 4 special-filenames ?plot data-file special-filenames ?plot datafile special-filenames ?plot special-filenames ?datafile special-filenames ?special-filenames A special filename of `'-'` specifies that the data are inline; i.e., they follow the command. Only the data follow the command; `plot` options like filters, titles, and line styles remain on the 'plot' command line. This is similar to << in unix shell script, and $DECK in VMS DCL. The data are entered as though they are being read from a file, one data point per record. The letter "e" at the start of the first column terminates data entry. The `using` option can be applied to these data---using it to filter them through a function might make sense, but selecting columns probably doesn't! `'-'` is intended for situations where it is useful to have data and commands together, e.g., when `gnuplot` is run as a sub-process of some front-end application. Some of the demos, for example, might use this feature. While `plot` options such as `index` and `every` are recognized, their use forces you to enter data that won't be used. For example, while plot '-' index 0, '-' index 1 2 4 6 10 12 14 e 2 4 6 10 12 14 e does indeed work, plot '-', '-' 2 4 6 e 10 12 14 e is a lot easier to type. If you use `'-'` with `replot`, you may need to enter the data more than once (see `replot`). A blank filename ('') specifies that the previous filename should be reused. This can be useful with things like plot 'a/very/long/filename' using 1:2, '' using 1:3, '' using 1:4 (If you use both `'-'` and `''` on the same `plot` command, you'll need to have two sets of inline data, as in the example above.) On some computer systems with a popen function (Unix), the datafile can be piped through a shell command by starting the file name with a '<'. For example, pop(x) = 103*exp(-x/10) plot "< awk '{print $1-1965, $2}' population.dat", pop(x) would plot the same information as the first population example but with years since 1965 as the x axis. If you want to execute this example, you have to delete all comments from the data file above or substitute the following command for the first part of the command above (the part up to the comma): plot "< awk '$0 !~ /^#/ {print $1-1965, $2}' population.dat" While this approach is most flexible, it is possible to achieve simple filtering with the `using` or `thru` keywords. 4 thru ?plot data-file thru ?plot datafile thru ?plot thru ?data-file thru ?datafile thru ?thru The `thru` function is provided for backward compatibility. Syntax: plot 'file' thru f(x) It is equivalent to: plot 'file' using 1:(f($2)) While the latter appears more complex, it is much more flexible. The more natural plot 'file' thru f(y) also works (i.e. you can use y as the dummy variable). `thru` is parsed for `splot` and `fit` but has no effect. 4 using ?plot data-file using ?plot datafile using ?plot using ?data-file using ?datafile using ?using The most common datafile modifier is `using`. Syntax: plot 'file' using {<entry> {:<entry> {:<entry> ...}}} {'format'} If a format is specified, each datafile record is read using the C library's 'scanf' function, with the specified format string. Otherwise the record is read and broken into columns at spaces or tabs. A format cannot be specified if time-format data is being used (this must be done by `set data time`). The resulting array of data is then sorted into columns according to the entries. Each <entry> may be a simple column number, which selects the datum, an expression enclosed in parentheses, or empty. The expression can use $1 to access the first item read, $2 for the second item, and so on. It can also use `column(x)` and `valid(x)` where x is an arbitrary expression resulting in an integer. `column(x)` returns the x'th datum; `valid(x)` tests that the datum in the x'th column is a valid number. A column number of 0 generates a number increasing (from zero) with each point, and is reset upon encountering two blank records. A column number of -1 gives the dataline number, which starts at 0, increments at single blank records, and is reset at double blank records. A column number of -2 gives the index number, which is incremented only when two blank records are found. An empty <entry> will default to its order in the list of entries. For example, `using ::4` is interpreted as `using 1:2:4`. N.B.---the `call` command also uses $'s as a special character. See `call` for details about how to include a column number in a `call` argument list. If the `using` list has but a single entry, that <entry> will be used for y and the data point number is used for x; for example, "`plot 'file' using 1`" is identical to "`plot 'file' using 0:1`". If the `using` list has two entries, these will be used for x and y. Additional entries are usually errors in x and/or y. See `set style` for details about plotting styles that make use of error information, and `fit` for use of error information in curve fitting. 'scanf' accepts several numerical specifications but `gnuplot` requires all inputs to be double-precision floating-point variables, so `lf` is the only permissible specifier. 'scanf' expects to see white space---a blank, tab ("\t"), newline ("\n"), or formfeed ("\f")---between numbers; anything else in the input stream must be explicitly skipped. Note that the use of "\t", "\n", or "\f" or requires use of double-quotes rather than single-quotes. Examples: This creates a plot of the sum of the 2nd and 3rd data against the first: (The format string specifies comma- rather than space-separated columns.) plot 'file' using 1:($2+$3) '%lf,%lf,%lf' In this example the data are read from the file "MyData" using a more complicated format: plot "MyData" using "%*lf%lf%*20[^\n]%lf" The meaning of this format is: %*lf ignore a number %lf read a double-precision number (x by default) %*20[^\n] ignore 20 non-newline characters %lf read a double-precision number (y by default) One trick is to use the ternary `?:` operator to filter data: plot 'file' using 1:($3>10 ? $2 : 1/0) which plots the datum in column two against that in column one provided the datum in column three exceeds ten. `1/0` is undefined; `gnuplot` quietly ignores undefined points, so unsuitable points are suppressed. In fact, you can use a constant expression for the column number, provided it doesn't start with an opening parenthesis; constructs like `using 0+(complicated expression)` can be used. The crucial point is that the expression is evaluated once if it doesn't start with a left parenthesis, or once for each data point read if it does. If timeseries data are being used, the time can span multiple columns. The starting column should be specified. Note that the spaces within the time must be included when calculating starting columns for other data. E.g., if the first element on a line is a time with an embedded space, the y value should be specified as column three. It should be noted that `plot 'file'`, `plot 'file' using 1:2`, and `plot 'file' using ($1):($2)` can be subtly different: 1) if `file` has some lines with one column and some with two, the first will invent x values when they are missing, the second will quietly ignore the lines with one column, and the third will store an undefined value for lines with one point (so that in a plot with lines, no line joins points across the bad point); 2) if a line contains text at the first column, the first will abort the plot on an error, but the second and third should quietly skip the garbage. In fact, it is often possible to plot a file with lots of lines of garbage at the top simply by specifying plot 'file' using 1:2 If you want to leave text in your data files, it is always safe to put the comment character (#) in the first column of the text lines. ^ <a href="http://www.nas.nasa.gov/~woo/gnuplot/using/using.html"> Feeble using demos. </a> 3 errorbars ?plot errorbars ?splot errorbars ?errorbars Error bars are supported for 2-d data file plots by reading one to four additional columns (or `using` entries); these additional values are used in different ways by the various errorbar styles. In the default situation, `gnuplot` expects to see three, four, or six numbers on each line of the data file---either (x, y, ydelta), (x, y, ylow, yhigh), (x, y, xdelta), (x, y, xlow, xhigh), (x, y, xdelta, ydelta), or (x, y, xlow, xhigh, ylow, yhigh). The x coordinate must be specified. The order of the numbers must be exactly as given above, though the `using` qualifier can manipulate the order and provide values for missing columns. For example, plot 'file' with errorbars plot 'file' using 1:2:(sqrt($1)) with xerrorbars plot 'file' using 1:2:($1-$3):($1+$3):4:5 with xyerrorbars The last example is for a file containing an unsupported combination of relative x and absolute y errors. The `using` entry generates absolute x min and max from the relative error. The y error bar is a vertical line plotted from (x, ylow) to (x, yhigh). If ydelta is specified instead of ylow and yhigh, ylow = y - ydelta and yhigh = y + ydelta are derived. If there are only two numbers on the record, yhigh and ylow are both set to y. The x error bar is a horizontal line computed in the same fashion. To get lines plotted between the data points, `plot` the data file twice, once with errorbars and once with lines (but remember to use the `notitle` option on one to avoid two entries in the key). The error bars have crossbars at each end unless `set bar` is used (see `set bar` for details). If autoscaling is on, the ranges will be adjusted to include the error bars. ^ <a href="http://www.nas.nasa.gov/~woo/gnuplot/errorbar/errorbar.html"> Errorbar demos. </a> See `plot using`, `plot with`, and `set style` for more information. 3 parametric ?plot parametric ?splot parametric ?parametric When in parametric mode (`set parametric`) mathematical expressions must be given in pairs for `plot` and in triplets for `splot`. Examples: plot sin(t),t**2 splot cos(u)*cos(v),cos(u)*sin(v),sin(u) Data files are plotted as before, except any preceding parametric function must be fully specified before a data file is given as a plot. In other words, the x parametric function (`sin(t)` above) and the y parametric function (`t**2` above) must not be interrupted with any modifiers or data functions; doing so will generate a syntax error stating that the parametric function is not fully specified. Other modifiers, such as `with` and `title`, may be specified only after the parametric function has been completed: plot sin(t),t**2 title 'Parametric example' with linespoints ^ <a href="http://www.nas.nasa.gov/~woo/gnuplot/param/param.html"> Parametric Mode Demos. </a> 3 ranges ?splot ranges ?plot ranges ?ranges The optional ranges specify the region of the graph that will be displayed. Syntax: [{<dummy-var>=}{{<min>}:{<max>}}] [{{<min>}:{<max>}}] The first form applies to the independent variable (`xrange` or `trange`, if in parametric mode). The second form applies to the dependent variable `yrange` (and `xrange`, too, if in parametric mode). <dummy-var> is a new name for the independent variable. (The defaults may be changed with `set dummy`.) The optional <min> and <max> terms can be constant expressions or *. In non-parametric mode, the order in which ranges must be given is `xrange` and `yrange`. In parametric mode, the order for the `plot` command is `trange`, `xrange`, and `yrange`. The following `plot` command shows setting the `trange` to [-pi:pi], the `xrange` to [-1.3:1.3] and the `yrange` to [-1:1] for the duration of the graph: plot [-pi:pi] [-1.3:1.3] [-1:1] sin(t),t**2 Note that the x2range and y2range cannot be specified here---`set x2range` and `set y2range` must be used. Ranges are interpreted in the order listed above for the appropriate mode. Once all those needed are specified, no further ones must be listed, but unneeded ones cannot be skipped---use an empty range `[]` as a placeholder. `*` can be used to allow autoscaling of either of min and max. See also `set autoscale`. Ranges specified on the `plot` or `splot` command line affect only that graph; use the `set xrange`, `set yrange`, etc., commands to change the default ranges for future graphs. With time data, you must provide the range (in the same manner as the time appears in the datafile) within quotes. `gnuplot` uses the `timefmt` string to read the value---see `set timefmt`. Examples: This uses the current ranges: plot cos(x) This sets the x range only: plot [-10:30] sin(pi*x)/(pi*x) This is the same, but uses t as the dummy-variable: plot [t = -10 :30] sin(pi*t)/(pi*t) This sets both the x and y ranges: plot [-pi:pi] [-3:3] tan(x), 1/x This sets only the y range, and turns off autoscaling on both axes: plot [ ] [-2:sin(5)*-8] sin(x)**besj0(x) This sets xmax and ymin only: plot [:200] [-pi:] exp(sin(x)) This sets the x range for a timeseries: set timefmt "%d/%m/%y %H:%M" plot ["1/6/93 12:00":"5/6/93 12:00"] 'timedata.dat' ^<a href="http://www.nas.nasa.gov/~woo/gnuplot/ranges/ranges.html"> See Demo. </a> 3 title ?plot title ?splot title A line title for each function and data set appears in the key, accompanied by a sample of the line and/or symbol used to represent it. It can be changed by using the `title` option. Syntax: title "<title>" | notitle where <title> is the new title of the line and must be enclosed in quotes. The quotes will not be shown in the key. A special character may be given as a backslash followed by its octal value ("\345"). The tab character "\t" is understood. Note that backslash processing occurs only for strings enclosed in double quotes---use single quotes to prevent such processing. The newline character "\n" is not processed in key entries in either type of string. The line title and sample can be omitted from the key by using the keyword `notitle`. A null title (`title ''`) is equivalent to `notitle`. If only the sample is wanted, use one or more blanks (`title ' '`). By default the line title is the function or file name as it appears on the `plot` command. If it is a file name, any datafile modifiers specified will be included in the default title. The layout of the key itself (position, title justification, etc.) can be controlled by `set key`. Please see `set key` for details. Examples: This plots y=x with the title 'x': plot x This plots x squared with title "x^2" and "data.1" with title 'measured data': plot x**2 title "x^2", "data.1" t 'measured data' This puts an untitled circular border around a polar graph: set polar; plot my_function(t), 1 notitle 3 with ?plot with ?plot style ?splot with ?splot style ?style ?with Functions and data may be displayed in one of a large number of styles. The `with` keyword provides the means of selection. Syntax: with <style> { {linestyle | ls <line_style>} | {{linetype | lt <line_type>} {linewidth | lw <line_width>} {pointtype | pt <point_type>} {pointsize | ps <point_size>}} } where <style> is either `lines`, `points`, `linespoints`, `impulses`, `dots`, `steps`, `fsteps`, `histeps`, `errorbars`, `xerrorbars`, `yerrorbars`, `xyerrorbars`, `boxes`, `boxerrorbars`, `boxxyerrorbars`, `financebars`, `candlesticks` or `vector`. Some of these styles require additional information. See `set style <style>` for details of each style. Default styles are chosen with the `set function style` and `set data style` commands. By default, each function and data file will use a different line type and point type, up to the maximum number of available types. All terminal drivers support at least six different point types, and re-use them, in order, if more are required. The LaTeX driver supplies an additional six point types (all variants of a circle), and thus will only repeat after 12 curves are plotted with points. The PostScript drivers (`postscript`) supplies a total of 64. If you wish to choose the line or point type for a single plot, <line_type> and <point_type> may be specified. These are positive integer constants (or expressions) that specify the line type and point type to be used for the plot. Use `test` to display the types available for your terminal. You may also scale the line width and point size for a plot by using <line_width> and <point_size>, which are specified relative to the default values for each terminal. The pointsize may also be altered globally---see `set pointsize` for details. But note that both <point_size> as set here and as set by `set pointsize` multiply the default point size---their effects are not cumulative. That is, `set pointsize 2; plot x w p ps 3` will use points three times default size, not six. If you have defined specific line type/width and point type/size combinations with `set linestyle`, one of these may be selected by setting <line_style> to the index of the desired style. The keywords may be abbreviated as indicated. Note that the linewidth and pointsize options are not supported by all terminals. Examples: This plots sin(x) with impulses: plot sin(x) with impulses This plots x with points, x**2 with the default: plot x*y w points, x**2 + y**2 This plots tan(x) with the default function style, "data.1" with lines: plot [ ] [-2:5] tan(x), "data.1" with l This plots "leastsq.dat" with impulses: plot 'leastsq.dat' w i This plots the data file 'population' with boxes: plot "population" with boxes This plots "exper.dat" with errorbars and lines connecting the points ('exper.dat' should have three or four data columns): plot 'exper.dat' w lines, 'exper.dat' notitle w errorbars This plots sin(x) and cos(x) with linespoints, using the same line type but different point types: plot sin(x) with linesp lt 1 pt 3, cos(x) with linesp lt 1 pt 4 This plots file "data" with points of type 3 and twice usual size: plot "data" with points pointtype 3 pointsize 2 This plots two data sets with lines differing only by weight: plot "d1" t "good" w l lt 2 lw 3, "d2" t "bad" w l lt 2 lw 1 See `set style` to change the default styles. ^ <a href="http://www.nas.nasa.gov/~woo/gnuplot/styles/styles.html"> Styles demos. </a> 2 print ?print The `print` command prints the value of <expression> to the screen. It is synonymous with `pause 0`. <expression> may be anything that `gnuplot` can evaluate that produces a number, or it can be a string. Syntax: print <expression> {, <expression>, ...} See `expressions`. 2 pwd ?pwd The `pwd` command prints the name of the working directory to the screen. 2 quit ?quit The `exit` and `quit` commands and END-OF-FILE character will exit `gnuplot`. Each of these commands will clear the output device (as does the `clear` command) before exiting. 2 replot ?replot The `replot` command without arguments repeats the last `plot` or `splot` command. This can be useful for viewing a plot with different `set` options, or when generating the same plot for several devices. Arguments specified after a `replot` command will be added onto the last `plot` or `splot` command (with an implied ',' separator) before it is repeated. `replot` accepts the same arguments as the `plot` and `splot` commands except that ranges cannot be specified. Thus you can use `replot` to plot a function against the second axes if the previous command was `plot` but not if it was `splot`, and similarly you can use `replot` to add a plot from a binary file only if the previous command was `splot`. N.B.---use of plot '-' ; ... ; replot is not recommended. `gnuplot` does not store the inline data internally, so since `replot` appends new information to the previous `plot` and then executes the modified command, the `'-'` from the initial `plot` will expect to read inline data again. Note that `replot` does not work in `multiplot` mode, since it reproduces only the last plot rather than the entire screen. See also `command-line-editing` for ways to edit the last `plot` (`splot`) command. 2 reread ?reread The `reread` command causes the current `gnuplot` command file, as specified by a `load` command or on the command line, to be reset to its starting point before further commands are read from it. This essentially implements an endless loop of the commands from the beginning of the command file to the `reread` command. (But this is not necessarily a disaster---`reread` can be very useful when used in conjunction with `if`. See `if` for details.) The `reread` command has no effect if input from standard input. Examples: Suppose the file "looper" contains the commands a=a+1 plot sin(x*a) pause -1 if(a<5) reread and from within `gnuplot` you submit the commands a=0 load 'looper' The result will be four plots (separated by the `pause` message). Suppose the file "data" contains six columns of numbers with a total yrange from 0 to 10; the first is x and the next are five different functions of x. Suppose also that the file "plotter" contains the commands c_p = c_p+1 plot "$0" using 1:c_p with lines linetype c_p if(c_p < n_p) reread and from within `gnuplot` you submit the commands n_p=6 c_p=1 set nokey set yrange [0:10] set multiplot call 'plotter' 'data' set nomultiplot The result is a single graph consisting of five plots. The yrange must be set explicitly to guarantee that the five separate graphs (drawn on top of each other in multiplot mode) will have exactly the same axes. The linetype must be specified; otherwise all the plots would be drawn with the same type. ^ <a href="http://www.nas.nasa.gov/~woo/gnuplot/animate/animate.html"> Reread Animation Demo</a> 2 reset ?reset The `reset` command causes all options that can be set with the `set` command to take on their default values. The only exceptions are that the terminal set with `set term` and the output file set with `set output` are left unchanged. This command is useful, e.g., to restore the default settings at the end of a command file, or to return to a defined state after lots of settings have been changed within a command file. Please refer to the `set` command to see the default values that the various options take. 2 save ?save The `save` command saves user-defined functions, variables, `set` options, or all three, plus the last `plot` (`splot`) command to the specified file. Syntax: save {<option>} "<filename>" where <option> is `functions`, `variables` or `set`. If no option is used, `gnuplot` saves functions, variables, `set` options and the last `plot` (`splot`) command. `save`d files are written in text format and may be read by the `load` command. The filename must be enclosed in quotes. Examples: save "work.gnu" save functions 'func.dat' save var 'var.dat' save set "options.dat" 2 set-show ?set ?show ?show all The `set` command sets _lots_ of options. No screen is drawn, however, until a `plot`, `splot`, or `replot` command is given. The `show` command shows their settings. `show all` shows all the settings. If a variable contains time/date data, `show` will display it according to the format currently defined by `set timefmt`, even if that was not in effect when the variable was initially defined. 3 angles ?set angles ?show angles ?angles ?set angles degrees By default, `gnuplot` assumes the independent variable in polar graphs is in units of radians. If `set angles degrees` is specified before `set polar`, then the default range is [0:360] and the independent variable has units of degrees. This is particularly useful for plots of data files. The angle setting also applies to 3-d mapping as set via the `set mapping` command. Syntax: set angles {degrees | radians} show angles The angle specified in `set grid polar` is also read and displayed in the units specified by `set angles`. `set angles` also affects the arguments of the machine-defined functions sin(x), cos(x) and tan(x), and the outputs of asin(x), acos(x), atan(x), atan2(x), and arg(x). It has no effect on the arguments of hyperbolic functions or Bessel functions. Note that the output of inverse hyperbolic functions of complex arguments are effected, however; if these functions are used, `set angles radians` must be in effect: x={1.0,0.1} set angles radians y=sinh(x) print y #prints {1.16933, 0.154051} print asinh(y) #prints {1.0, 0.1} but set angles degrees y=sinh(x) print y #prints {1.16933, 0.154051} print asinh(y) #prints {57.29578, 5.729578} ^ <a href="http://www.nas.nasa.gov/~woo/gnuplot/poldat/poldat.html"> Polar plot using `set angles`. </a> 3 arrow ?set arrow ?set noarrow ?show arrow ?arrow ?noarrow Arbitrary arrows can be placed on a plot using the `set arrow` command. Syntax: set arrow {<tag>} {from <position>} {to <position>} {{no}head} { {linestyle | ls <line_style>} | {linetype | lt <line_type>} {linewidth | lw <line_width} } set noarrow {<tag>} show arrow <tag> is an integer that identifies the arrow. If no tag is given, the lowest unused tag value is assigned automatically. The tag can be used to delete or change a specific arrow. To change any attribute of an existing arrow, use the `set arrow` command with the appropriate tag and specify the parts of the arrow to be changed. The <position>s are specified by either x,y or x,y,z, and may be preceded by `first`, `second`, `graph`, or `screen` to select the coordinate system. Unspecified coordinates default to 0. The endpoints can be specified in one of four coordinate systems---`first` or `second` axes, `graph` or `screen`. See `coordinates` for details. A coordinate system specifier does not carry over from the "from" position to the "to" position. Arrows outside the screen boundaries are permitted but may cause device errors. Specifying `nohead` produces an arrow drawn without a head---a line segment. This gives you yet another way to draw a line segment on the plot. By default, arrows have heads. The line style may be selected from a user-defined list of line styles (see `set linestyle`) or may be defined here by providing values for <line_type> (an index from the default list of styles) and/or <line_width> (which is a multiplier for the default width). Note, however, that if a user-defined line style has been selected, its properties (type and width) cannot be altered merely by issuing another `set arrow` command with the appropriate index and `lt` or `lw`. Examples: To set an arrow pointing from the origin to (1,2) with user-defined style 5, use: set arrow to 1,2 ls 5 To set an arrow from bottom left of plotting area to (-5,5,3), and tag the arrow number 3, use: set arrow 3 from graph 0,0 to -5,5,3 To change the preceding arrow to end at 1,1,1, without an arrow head and double its width, use: set arrow 3 to 1,1,1 nohead lw 2 To draw a vertical line from the bottom to the top of the graph at x=3, use: set arrow from 3, graph 0 to 3, graph 1 nohead To delete arrow number 2, use: set noarrow 2 To delete all arrows, use: set noarrow To show all arrows (in tag order), use: show arrow ^ <a href="http://www.nas.nasa.gov/~woo/gnuplot/arrows/arrows.html"> Arrows Demos. </a> 3 autoscale ?set autoscale ?set noautoscale ?show autoscale ?autoscale ?noautoscale Autoscaling may be set individually on the x, y or z axis or globally on all axes. The default is to autoscale all axes. Syntax: set autoscale {<axes>{min|max}} set noautoscale {<axes>{min|max}} show autoscale where <axes> is either `x`, `y`, `z`, `x2`, `y2` or `xy`. A keyword with `min` or `max` appended (this cannot be done with `xy`) tells `gnuplot` to autoscale just the minimum or maximum of that axis. If no keyword is given, all axes are autoscaled. When autoscaling, the axis range is automatically computed and the dependent axis (y for a `plot` and z for `splot`) is scaled to include the range of the function or data being plotted. If autoscaling of the dependent axis (y or z) is not set, the current y or z range is used. Autoscaling the independent variables (x for `plot` and x,y for `splot`) is a request to set the domain to match any data file being plotted. If there are no data files, autoscaling an independent variable has no effect. In other words, in the absence of a data file, functions alone do not affect the x range (or the y range if plotting z = f(x,y)). Please see `set xrange` for additional information about ranges. The behavior of autoscaling remains consistent in parametric mode, (see `set parametric`). However, there are more dependent variables and hence more control over x, y, and z axis scales. In parametric mode, the independent or dummy variable is t for `plot`s and u,v for `splot`s. `autoscale` in parametric mode, then, controls all ranges (t, u, v, x, y, and z) and allows x, y, and z to be fully autoscaled. Autoscaling works the same way for polar mode as it does for parametric mode for `plot`, with the extension that in polar mode `set dummy` can be used to change the independent variable from t (see `set dummy`). When tics are displayed on second axes but no plot has been specified for those axes, x2range and y2range are inherited from xrange and yrange. This is done _before_ xrange and yrange are autoextended to a whole number of tics, which can cause unexpected results. Examples: This sets autoscaling of the y axis (other axes are not affected): set autoscale y This sets autoscaling only for the minimum of the y axis (the maximum of the y axis and the other axes are not affected): set autoscale ymin This sets autoscaling of the x and y axes: set autoscale xy This sets autoscaling of the x, y, z, x2 and y2 axes: set autoscale This disables autoscaling of the x, y, z, x2 and y2 axes: set noautoscale This disables autoscaling of the z axis only: set noautoscale z 4 parametric mode ?set autoscale parametric ?set autoscale t When in parametric mode (`set parametric`), the xrange is as fully scalable as the y range. In other words, in parametric mode the x axis can be automatically scaled to fit the range of the parametric function that is being plotted. Of course, the y axis can also be automatically scaled just as in the non-parametric case. If autoscaling on the x axis is not set, the current x range is used. Data files are plotted the same in parametric and non-parametric mode. However, there is a difference in mixed function and data plots: in non-parametric mode with autoscaled x, the x range of the datafile controls the x range of the functions; in parametric mode it has no influence. For completeness a last command `set autoscale t` is accepted. However, the effect of this "scaling" is very minor. When `gnuplot` determines that the t range would be empty, it makes a small adjustment if autoscaling is true. Otherwise, `gnuplot` gives an error. Such behavior may, in fact, not be very useful and the command `set autoscale t` is certainly questionable. `splot` extends the above ideas as you would expect. If autoscaling is set, then x, y, and z ranges are computed and each axis scaled to fit the resulting data. 4 polar mode ?set autoscale polar ?set autoscale t When in polar mode (`set polar`), the xrange and the yrange are both found from the polar coordinates, and thus they can both be automatically scaled. In other words, in polar mode both the x and y axes can be automatically scaled to fit the ranges of the polar function that is being plotted. When plotting functions in polar mode, the rrange may be autoscaled. When plotting data files in polar mode, the trange may also be autoscaled. Note that if the trange is contained within one quadrant, autoscaling will produce a polar plot of only that single quadrant. Explicitly setting one or two ranges but not others may lead to unexpected results. ^ <a href="http://www.nas.nasa.gov/~woo/gnuplot/poldat/poldat.html"> See polar demos </a> 3 bar ?set bar ?show bar The `set bar` command controls the tics at the ends of errorbars. Syntax: set bar {small | large | <size>} show bar `small` is a synonym for 0.0, and `large` for 1.0. The default is 1.0 if no size is given. 3 bmargin ?set bmargin ?bmargin The command `set bmargin` sets the size of the bottom margin. Please see `set margin` for details. 3 border ?set border ?set noborder ?show border ?border ?noborder The `set border` and `set noborder` commands control the display of the graph borders for the `plot` and `splot` commands. Syntax: set border {<integer>} set noborder show border The borders are encoded in a 12-bit integer. The bottom four bits control the border for `plot` and the sides of the base for `splot`, the next four bits control the verticals in `splot` and the top four bits control the edges on top of the `splot`. In detail, the `<integer>` should be the sum of the appropriate entries from the following table: @start table - first is interactive cleartext form plot border and splot base splot verticals splot top bottom (south) 1 16 256 left (west) 2 32 512 top (north) 4 64 1024 right (east) 8 128 2048 #\multicolumn{4}{|c|}{Border Specification} \\ # & plot border & & \\ # & and & & \\ # & splot base & splot verticals & splot top \\ \hline #bottom (south) & 1 & 16 & 256 \\ #left (west) & 2 & 32 & 512 \\ #top (north) & 4 & 64 & 1024 \\ #right (east) & 8 & 128 & 2048 \\ %@plot border@@ %@and@@ %@splot base@splot verticals@splot top %_ %bottom (south)@1@16@256 %left (west)@2@32@512 %top (north)@4@64@1024 %right (east)@8@128@2048 @end table The default is 31, which is all four sides for `plot`, and base and z axis for `splot`. To have tics on edges other than bottom and left, disable the usual tics and enable the second axes. Examples: Draw all borders: set border Draw only the SOUTHWEST borders: set border 3 Draw a complete box around a `splot`: set border 4095 Draw a partial box, omitting the front vertical: set border 127+256+512 Draw only the NORTHEAST borders: set noxtics; set noytics; set x2tics; set y2tics; set border 12 ^ <a href="http://www.nas.nasa.gov/~woo/gnuplot/borders/borders.html"> Borders Demo. </a> 3 boxwidth ?set boxwidth ?show boxwidth ?boxwidth The `set boxwidth` command is used to set the default width of boxes in the `boxes` and `boxerrorbars` styles. Syntax: set boxwidth {<width>} show boxwidth If a data file is plotted without the width being specified in the third, fourth, or fifth column (or `using` entry), or if a function is plotted, the width of each box is set by the `set boxwidth` command. (If a width is given both in the file and by the `set boxwidth` command, the one in the file is used.) If the width is not specified in one of these ways, the width of each box will be calculated automatically so that it touches the adjacent boxes. In a four-column data set, the fourth column will be interpreted as the box width unless the width is set to -2.0, in which case the width will be calculated automatically. See `set style boxerrorbars` for more details. To set the box width to automatic use the command set boxwidth or, for four-column data, set boxwidth -2 The same effect can be achieved with the `using` keyword in `plot`: plot 'file' using 1:2:3:4:(-2) 3 clabel ?set clabel ?set noclabel ?show clabel ?clabel ?noclabel `gnuplot` will vary the linetype used for each contour level when clabel is set. When this option on (the default), a legend labels each linestyle with the z level it represents. It is not possible at present to separate the contour labels from the surface key. Syntax: set clabel {'<format>'} set noclabel show clabel The default for the format string is %8.3g, which gives three decimal places. This may produce poor label alignment if the key is altered from its default configuration. See also `set contour`. 3 clip ?set clip ?set noclip ?show clip ?clip ?noclip `gnuplot` can clip data points and lines that are near the boundaries of a graph. Syntax: set clip <clip-type> set noclip <clip-type> show clip Three clip types are supported by `gnuplot`: `points`, `one`, and `two`. One, two, or all three clip types may be active for a single graph. The `points` clip type forces `gnuplot` to clip (actually, not plot at all) data points that fall within but too close to the boundaries. This is done so that large symbols used for points will not extend outside the boundary lines. Without clipping points near the boundaries, the plot may look bad. Adjusting the x and y ranges may give similar results. Setting the `one` clip type causes `gnuplot` to draw a line segment which has only one of its two endpoints within the graph. Only the in-range portion of the line is drawn. The alternative is to not draw any portion of the line segment. Some lines may have both endpoints out of range, but pass through the graph. Setting the `two` clip-type allows the visible portion of these lines to be drawn. In no case is a line drawn outside the graph. The defaults are `noclip points`, `clip one`, and `noclip two`. To check the state of all forms of clipping, use show clip For backward compatibility with older versions, the following forms are also permitted: set clip set noclip `set clip` is synonymous with `set clip points`; `set noclip` turns off all three types of clipping. 3 cntrparam ?set cntrparam ?show cntrparam ?cntrparam `set cntrparam` controls the generation of contours and their smoothness for a contour plot. Syntax: set cntrparam { {linear | cubicspline | bspline} | points <n> | order <n> | levels {auto} {<n>} | discrete <z1> {,<z2>} ... | incremental {<start>, <incr> {,<end>}} } show cntrparam This command controls the way contours are plotted. <n> should be an integral constant expression and <z1>, <z2> ... any constant expressions. The parameters are: `linear`, `cubicspline`, `bspline`---Controls type of approximation or interpolation. If `linear`, then the contours are drawn piecewise linear, as extracted from the surface directly. If `cubicspline`, then piecewise linear contours are interpolated to form somewhat smoother contours, but which may undulate. If `bspline`, a guaranteed-smoother curve is drawn, which only approximates the piecewise linear data. `points`---Eventually all drawings are done with piecewise linear strokes. This number controls the number of points used to approximate a curve. It is relevant only for `cubicspline` and `bspline` modes. `order`---Order of the bspline approximation to be used. The bigger this order is, the smoother the resulting contour. (Of course, higher order bspline curves will move further away from the original piecewise linear data.) This option is relevant for `bspline` mode only. Allowed values are integers in the range from 2 (linear) to 10. `levels`---Approximate number of contour levels. Selection of the levels is controlled by `auto` (default), `discrete`, and `incremental`. For `auto`, if the surface is bounded by zmin and zmax, contours will be generated at integer multiples of dz between zmin and zmax, where dz is 1, 2, or 5 times some power of ten (like the step between two tic marks). For `discrete`, contours will be generated at z = <z1>, <z2> ... as specified. The number of discrete levels is limited to MAX_DISCRETE_LEVELS, defined in plot.h to be 30. If `incremental`, contours are generated at values of z beginning at <start> and increasing by <increment> until <end> is reached. If <end> is not specified, MAX_DISCRETE_LEVELS will be generated. If the command `set cntrparam` is given without any arguments specified, the defaults are used: linear, 5 points, order 4, 5 `auto` levels. Examples: set cntrparam bspline set cntrparam points 7 set cntrparam order 10 To select 5 levels automatically: set cntrparam levels auto 5 To specify discrete levels at .1, .37, and .9: set cntrparam levels discrete .1,1/exp(1),.9 To specify levels from 0 to 4 with increment 1: set cntrparam levels incremental 0,1,4 To set the number of levels to 10 (retaining the current settings of auto, discr. and increment's start and increment value, while changing its end): set cntrparam levels 10 To set the start and increment while retaining the number of levels: set cntrparam levels incremental 100,50 See also `set contour` for control of where the contours are drawn, and `set clabel` for control of the format of the contour labels. ^ <a href="http://www.nas.nasa.gov/~woo/gnuplot/contours/contours.html">Contours Demo</a> and ^ <a href="http://www.nas.nasa.gov/~woo/gnuplot/discrete/discrete.html">contours with User Defined Levels.</a> 3 contour ?set contour ?set nocontour ?show contour ?contour ?nocontour `set contour` enables contour drawing for surfaces. This option is available for `splot` only. Syntax: set contour {base | surface | both} set nocontour show contour The three options specify where to draw the contours: `base` draws the contours on the grid base where the x/ytics are placed, `surface` draws the contours on the surfaces themselves, and `both` draws the contours on both the base and the surface. If no option is provided, the default is `base`. See also `set cntrparam` for the parameters that affect the drawing of contours, and `set clabel` for control of labelling of the contours. The surface can be switched off (see `set surface`), giving a contour-only graph. Though it is possible to use `set view` to enlarge the plot to fill the screen, better results can be obtained by writing the contour information out to a file, and rereading it as a 2-d datafile plot: set nosurface set contour set cntrparam ... set term table set out 'filename' splot ... set out # contour info now in filename set term <whatever> plot 'filename' In order to draw contours, the data must be organized as "grid data". In such a file all of the points for a single y value are listed, then all the points for the next y, and so on. A single blank line (a line containing no characters other than blank spaces and a carriage return and/or a line feed) separates one y value group from the next. See also `plot datafile`. If contours are desired from non-grid data, `set dgrid3d` can be used to create an appropriate grid. See `set dgrid3d` for more information. ^ <a href="http://www.nas.nasa.gov/~woo/gnuplot/contours/contours.html">Contours Demo</a> and ^ <a href="http://www.nas.nasa.gov/~woo/gnuplot/discrete/discrete.html">contours with User Defined Levels.</a> 3 data style ?set data style ?show data style ?data style The `set data style` command changes the default plotting style for data plots. Syntax: set data style <style-choice> show data style See `set style` for the choices. If no choice is given, the choices are listed. `show data style` shows the current default data plotting style. 3 dgrid3d ?set dgrid3d ?set nodgrid3d ?show dgrid3d ?dgrid3d ?nodgrid3d The `set dgrid3d` command enables and sets the different parameters for non-grid to grid data mapping. Syntax: set dgrid3d {<row_size>} {,{<col_size>} {,<norm>}} set nodgrid3d show dgrid3d By default `dgrid3d` is disabled. When enabled, 3-d data read from a file are always treated as a scattered data set. A grid with dimensions derived from a bounding box of the scattered data and size as specified by the row/col_size parameters is created for plotting and contouring. The grid is equally spaced in x and y; the z values are computed as weighted averages of the scattered points' values. The third parameter, norm, controls the weighting: each point is weighted inversely by its distance (from the grid point) raised to the norm power. (Actually it's not quite the distance: the weights are given by the inverse of dx^norm + dy^norm, where dx and dy are the components of the separation of the grid point from each data point.) Thus the closer the data point is to a grid point, the more effect it has on that grid point. In `gnuplot`, this distance computation is optimized for norms that are powers of 2, specifically 1, 2, 4, 8, and 16, but any non-negative integer can be used. The `dgrid3d` option is a simple low pass filter that converts scattered data to a grid data set. More sophisticated approaches to this problem exist and should be used to preprocess the data outside `gnuplot` if this simple solution is found inadequate. Examples: set dgrid3d 10,10,1 # defaults set dgrid3d ,,4 The first specifies that a grid of size 10 by 10 is to be constructed using the L2 norm (a norm of 2 is to be used in the distance computation). The second only modifies the norm to be used to L4. ^ <a href="http://www.nas.nasa.gov/~woo/gnuplot/scatter/scatter.html"> Dgrid3d Demo.</a> 3 dummy ?set dummy ?show dummy ?dummy The `set dummy` command changes the default dummy variable names. Syntax: set dummy {<dummy-var>} {,<dummy-var>} show dummy By default, `gnuplot` assumes that the independent, or "dummy", variable for the `plot` command is "t" if in parametric or polar mode, or "x" otherwise. Similarly the independent variables for the `splot` command are "u" and "v" in parametric mode (`splot` cannot be used in polar mode), or "x" and "y" otherwise. It may be more convenient to call a dummy variable by a more physically meaningful or conventional name. For example, when plotting time functions: set dummy t plot sin(t), cos(t) At least one dummy variable must be set on the command; `set dummy` by itself will generate an error message. Examples: set dummy u,v set dummy ,s The second example sets the second variable to s. 3 encoding ?set encoding ?show encoding ?encoding The `set encoding` command selects a character encoding. Valid values are `default`, which does nothing; `iso_8859_1` (known in the PostScript world as `ISO-Latin1`), which is used on many Unix workstations and with MS-Windows; `cp850`, for OS/2; and `cp437`, for MS-DOS. Syntax: set encoding <value> show encoding Please note that this is not supported on all terminal types. Note also that the device must be able to produce the non-standard characters. 3 format ?set format ?show format ?format The format of the tic-mark labels can be set with the `set format` command. Syntax: set format {<axes>} {"<format-string>"} set format {<axes>} {'<format-string>'} show format where <axes> is either `x`, `y`, `z`, `xy`, `x2`, `y2` or nothing (which is the same as `xy`). The length of the string representing a ticmark (after formatting with 'printf') is restricted to 100 characters. If the format string is omitted, the format will be returned to the default "%g". For LaTeX users, the format "$%g$" is often desirable. If the empty string "" is used, no label will be plotted with each tic, though the tic mark will still be plotted. To eliminate all tic marks, use `set noxtics` or `set noytics`. Newline (\n) is accepted in the format string. Use double-quotes rather than single-quotes to enable such interpretation. See also `syntax`. The default format for both axes is "%g", but other formats such as "%.2f" or "%3.0em" are often desirable. Anything accepted by 'printf' when given a double precision number, and accepted by the terminal, will work. Some other options have been added. If the format string looks like a floating point format, then `gnuplot` tries to construct a reasonable format. Characters not preceded by "%" are printed verbatim. Thus you can include spaces and labels in your format string, such as "%g m", which will put " m" after each number. If you want "%" itself, double it: "%g %%". The acceptable formats (if not in date/time mode) are: @start table - first is interactive cleartext form Format Explanation %f floating point notation %e or %E exponential notation; an "e" or "E" before the power %g or %G the shorter of %e (or %E) and %f %x or %X hex %o or %O octal %t mantissa to base 10 %l mantissa to base of current logscale %s mantissa to base of current logscale; scientific power %T power to base 10 %L power to base of current logscale %S scientific power %c character replacement for scientific power %P multiple of pi #\multicolumn{3}{|c|}{Format Specifiers}\\ #Format && Explanation \\ \hline #\verb@%f@ && floating point notation \\ #\verb@%e@ or \verb@%E@ && exponential notation; an "e" or "E" before the power \\ #\verb@%g@ or \verb@%G@ && the shorter of \verb@%e@ (or \verb@%E@) and \verb@%f@ \\ #\verb@%x@ or \verb@%X@ && hex \\ #\verb@%o@ or \verb@%O@ && octal \\ #\verb@%t@ && mantissa to base 10 \\ #\verb@%l@ && mantissa to base of current logscale \\ #\verb@%s@ && mantissa to base of current logscale; scientific power \\ #\verb@%T@ && power to base 10 \\ #\verb@%L@ && power to base of current logscale \\ #\verb@%S@ && scientific power \\ #\verb@%c@ && character replacement for scientific power \\ #\verb@%P@ && multiple of pi \\ %Format@Explanation %_ %%f@floating point notation %%e or %E@exponential notation; an "e" or "E" before the power %%g or %G@the shorter of %e (or %E) and %f %%x or %X@hex %%o or %O@octal %%t@mantissa to base 10 %%l@mantissa to base of current logscale %%s@mantissa to base of current logscale; scientific power %%T@power to base 10 %%L@power to base of current logscale %%S@scientific power %%c@character replacement for scientific power %%P@multiple of pi %_ @end table A 'scientific' power is one such that the exponent is a multiple of three. Character replacement of scientific powers (`"%c"`) has been implemented for powers in the range -18 to +18. For numbers outside of this range the format reverts to exponential. Other acceptable modifiers (which come after the "%" but before the format specifier) are "-", which left-justifies the number; "+", which forces all numbers to be explicitly signed; "#", which places a decimal point after floats that have only zeroes following the decimal point; a positive integer, which defines the field width; "0" (the digit, not the letter) immediately preceding the field width, which indicates that leading zeroes are to be used instead of leading blanks; and a decimal point followed by a non-negative integer, which defines the precision (the minimum number of digits of an integer, or the number of digits following the decimal point of a float). Some releases of 'printf' may not support all of these modifiers but may also support others; in case of doubt, check the appropriate documentation and then experiment. Examples: set format y "%t"; set ytics (5,10) # "5.0" and "1.0" set format y "%s"; set ytics (500,1000) # "500" and "1.0" set format y "+-12.3f"; set ytics(12345) # "+12345.000 " set format y "%.2t*10^%+03T"; set ytic(12345)# "1.23*10^+04" set format y "%s*10^{%S}"; set ytic(12345) # "12.345*10^{3}" set format y "%s %cg"; set ytic(12345) # "12.345 kg" set format y "%.0P pi"; set ytic(6.283185) # "2 pi" set format y "%.0P%%"; set ytic(50) # "50%" set log y 2; set format y '%l'; set ytics (1,2,3) #displays "1.0", "1.0" and "1.5" (since 3 is 1.5 * 2^1) There are some problem cases that arise when numbers like 9.999 are printed with a format that requires both rounding and a power. If the data type for the axis is date/time, the format string must contain valid codes for the 'strftime' function (outside of `gnuplot`, type "man strftime"). See `set timefmt` for a list of the allowed input format codes. In date/time mode, the acceptable formats are: @start table - first is interactive cleartext form Format Explanation %a abbreviated name of day of the week %A full name of day of the week %b or %h abbreviated name of the month %B full name of the month %d day of the month, 1--31 %D shorthand for "%m/%d/%y" %H or %k hour, 0--24 %I or %l hour, 0--12 %j day of the year, 1--366 %m month, 1--12 %M minute, 0--60 %p "am" or "pm" %r shorthand for "%I:%M:%S %p" %R shorthand for %H:%M" %S second, 0--60 %T shorthand for "%H:%M:%S" %U week of the year (week starts on Sunday) %w day of the week, 0--6 (Sunday = 0) %W week of the year (week starts on Monday) %y year, 0-99 %Y year, 4-digit #\multicolumn{3}{|c|}{Date/Time Format Specifiers}\\ #Format && Explanation \\ \hline #\verb@%a@ && abbreviated name of day of the week \\ #\verb@%A@ && full name of day of the week \\ #\verb@%b@ or \verb@%h@ && abbreviated name of the month \\ #\verb@%B@ && full name of the month \\ #\verb@%d@ && day of the month, 1--31 \\ #\verb@%D@ && shorthand for \verb@"%m/%d/%y"@ \\ #\verb@%H@ or \verb@%k@ && hour, 0--24 \\ #\verb@%I@ or \verb@%l@ && hour, 0--12 \\ #\verb@%j@ && day of the year, 1--366 \\ #\verb@%m@ && month, 1--12 \\ #\verb@%M@ && minute, 0--60 \\ #\verb@%p@ && "am" or "pm" \\ #\verb@%r@ && shorthand for \verb@"%I:%M:%S %p"@ \\ #\verb@%R@ && shorthand for \verb@%H:%M"@ \\ #\verb@%S@ && second, 0--60 \\ #\verb@%T@ && shorthand for \verb@"%H:%M:%S"@ \\ #\verb@%U@ && week of the year (week starts on Sunday) \\ #\verb@%w@ && day of the week, 0--6 (Sunday = 0) \\ #\verb@%W@ && week of the year (week starts on Monday) \\ #\verb@%y@ && year, 0-99 \\ #\verb@%Y@ && year, 4-digit \\ %Format@Explanation %_ %%a@abbreviated name of day of the week %%A@full name of day of the week %%b or %h@abbreviated name of the month %%B@full name of the month %%d@day of the month, 1--31 %%D@shorthand for "%m/%d/%y" %%H or %k@hour, 0--24 %%I or %l@hour, 0--12 %%j@day of the year, 1--366 %%m@month, 1--12 %%M@minute, 0--60 %%p@"am" or "pm" %%r@shorthand for "%I:%M:%S %p" %%R@shorthand for %H:%M" %%S@second, 0--60 %%T@shorthand for "%H:%M:%S" %%U@week of the year (week starts on Sunday) %%w@day of the week, 0--6 (Sunday = 0) %%W@week of the year (week starts on Monday) %%y@year, 0-99 %%Y@year, 4-digit %_ @end table Except for the non-numerical formats, these may be preceded by a "0" ("zero", not "oh") to pad the field length with leading zeroes, and a positive digit, to define the minimum field width (which will be overridden if the specified width is not large enough to contain the number). There is a 24-character limit to the length of the printed text; longer strings will be truncated. Examples: Suppose the text is "76/12/25 23:11:11". Then set format x # defaults to "12/25/76" \n "23:11" set format x "%A, %d %b %Y" # "Saturday, 25 Dec 1976" set format x "%r %d" # "11:11:11 pm 12/25/76" Suppose the text is "98/07/06 05:04:03". Then set format x "%1y/%2m/%3d %01H:%02M:%03S" # "98/ 7/ 6 5:04:003" See also `set xtics` for more information about tic labels. ^ <a href="http://www.nas.nasa.gov/~woo/gnuplot/electron/electron.html"> See demo. </a> 3 function style ?set function style ?show function style ?function style The `set function style` command changes the default plotting style for function plots. Syntax: set function style <style-choice> show function style See `set style` for the choices. If no choice is given, the choices are listed. `show function style` shows the current default function plotting style. 3 functions ?show functions The `show functions` command lists all user-defined functions and their definitions. Syntax: show functions For information about the definition and usage of functions in `gnuplot`, please see `expressions` and `user-defined`. ^ <a href="http://www.nas.nasa.gov/~woo/gnuplot/spline/spline.html"> Splines as User Defined Functions.</a> ^ <a href="http://www.nas.nasa.gov/~woo/gnuplot/airfoil/airfoil.html">Use of functions and complex variables for airfoils </a> 3 grid ?set grid ?set nogrid ?show grid ?grid ?nogrid The `set grid` command allows grid lines to be drawn on the plot. Syntax: set grid {{no}{m}xtics} {{no}{m}ytics} {{no}{m}ztics} {{no}{m}x2tics} {{no}{m}y2tics} {polar {<angle>}} {<major_linetype> {<minor_linetype>}} set nogrid show grid The grid can be enabled and disabled for the major and/or minor tic marks on any axis, and the linetype can be specified for major and minor grid lines. But note that <major_linetype> and <minor_linetype> are indices in the default linetype list provided by the terminal; user-defined linetypes (via the `set linestyle` command) are not accessible for grid lines. Additionally, a polar grid can be selected for 2-d plots---circles are drawn to intersect the selected tics, and radial lines are drawn at definable intervals. (The interval is given in degrees or radians ,depending on the `set angles` setting.) Note that a polar grid is no longer automatically generated in polar mode. The pertinent tics must be enabled before `set grid` can draw them; `gnuplot` will quietly ignore instructions to draw grid lines at non-existent tics, but they will appear if the tics are subsequently enabled. If no linetype is specified for the minor gridlines, the same linetype as the major gridlines is used. The default polar angle is 30 degrees. Z grid lines are drawn on the back of the plot. This looks better if a partial box is drawn around the plot---see `set border`. 3 hidden3d ?set hidden3d ?set nohidden3d ?show hidden3d ?hidden3d ?nohidden3d The `set hidden3d` command enables hidden line removal for explicit surface plotting (see `splot`). Syntax: set hidden3d set nohidden3d show hidden3d Hidden line removal may be used for both explicit functions and for explicit data. It now works for parametric surfaces as well. This mode is meaningful only when surfaces are `splot`ted `with lines`. When this flag is set, both the hidden portion of the surface and possibly its hidden contours (see `set contour`) as well as the hidden grid will be removed. Each surface has its hidden parts removed with respect to itself and to other surfaces, if more than one surface is plotted. But contours drawn on the surface (`set contour surface`) don't seem to work. Labels and arrows are always visible and are unaffected. ^ <a href="http://www.nas.nasa.gov/~woo/gnuplot/hidden/hidden.html"> Hidden Line Removal Demo</a> and ^ <a href="http://www.nas.nasa.gov/~woo/gnuplot/singulr/singulr.html"> Complex Hidden Line Demo. </a> 3 isosamples ?set isosamples ?show isosamples ?isosamples The isoline density of surfaces may be changed by the `set isosamples` command. Syntax: set isosamples <iso_1> {,<iso_2>} show isosamples Each surface plot will have <iso_1> iso-u lines and <iso_2> iso-v lines. If you only specify <iso_1>, <iso_2> will be set to the same value as <iso_1>. By default, sampling is set to 10 isolines per u or v axis. A higher sampling rate will produce more accurate plots, but will take longer. These parameters have no effect on data file plotting. An isoline is a curve parameterized by one of the surface parameters while the other surface parameter is fixed. Isolines provide a simple means to display a surface. By fixing the u parameter of surface s(u,v), the iso-u lines of the form c(v) = s(u0,v) are produced, and by fixing the v parameter, the iso-v lines of the form c(u) = s(u,v0) are produced. When a surface plot is being done without the removal of hidden lines, `set samples` also has an effect on the number of points being evaluated---it controls the number of points sampled along each isoline. See `set samples`. 3 key ?set key ?set nokey ?show key ?key ?nokey ?legend The `set key` enables a key (or legend) describing plots on a plot. The contents of the key, i.e., the names given to each plotted data set and function and samples of the lines and/or symbols used to represent them, are determined by the `title` and `with` options of the {`s`}`plot` command. Please see `plot title` and `plot with` for more information. Syntax: set key { left | right | top | bottom | outside | below | <position>} {Left | Right} {{no}reverse} {samplen <sample_length>} {spacing <vertical_spacing>} {width <width_increment>} {title "<text>"} {{no}box {<linetype>}} set nokey show key By default the key is placed in the upper right corner of the graph. The keywords `left`, `right`, `top`, `bottom`, `outside` and `below` may be used to place the key in the other corners inside the graph or to the right (outside) or below the graph. They may be given alone or combined. Justification of the labels within the key is controlled by `Left` or `Right` (default is `Right`). The text and sample can be reversed (`reverse`) and a box can be drawn around the key (`box {<linetype>}`) in a specified linetype. But note that <linetype> is an index in the default linetype list provided by the terminal; user-defined linetypes (via the `set linestyle` command) are not accessible for the key box. The length of the sample line can be controlled by `samplen`. The sample length is computed as the sum of the tic length and <sample_length> times the character width. `samplen` also affects the positions of point samples in the key since these are drawn at the midpoint of the sample line, even if it is not drawn. <sample_length> must be an integer. The vertical spacing between lines is controlled by `spacing`. The spacing is set equal to the product of the pointsize, the vertical tic size, and <vertical_spacing>. The program will guarantee that the vertical spacing is no smaller than the character height. The <width_increment> is a number of character widths to be added to or subtracted from the length of the string. This is useful only when you are putting a box around the key and you are using control characters in the text. `gnuplot` simply counts the number of characters in the string when computing the box width; this allows you to correct it. A title can be put on the key (`title "<text>"`)---see also `syntax` for the distinction between text in single- or double-quotes. The key title uses the same justification as do the plot titles. The defaults for `set key` are `right`, `top`, `Right`, `noreverse`, `samplen 4`, `spacing 1.25`, `title ""`, and `nobox`. The default <linetype> is the same as that used for the plot borders. Entering `set key` with no options returns the key to its default configuration. The <position> can be a simple x,y,z as in previous versions, but these can be preceded by one of four keywords (`first`, `second`, `graph`, `screen`) which selects the coordinate system in which the position is specified. See `coordinates` for more details. The key is drawn as a sequence of lines, with one plot described on each line. On the right-hand side (or the left-hand side, if `reverse` is selected) of each line is a representation that attempts to mimic the way the curve is plotted. On the other side of each line is the text description (the line title), obtained from the `plot` command. The lines are vertically arranged so that an imaginary straight line divides the left- and right-hand sides of the key. It is the coordinates of the top of this line that are specified with the `set key` command. In a `plot`, only the x and y coordinates are used to specify the line position. For a `splot`, x, y and z are all used as a 3-d location mapped using the same mapping as the graph itself to form the required 2-d screen position of the imaginary line. Some or all of the key may be outside of the graph boundary, although this may interfere with other labels and may cause an error on some devices. If you use the keywords `outside` or `below`, `gnuplot` makes space for the keys and the graph becomes smaller. Putting keys outside to the right, they occupy as few columns as possible, and putting them below, as many columns as possible (depending of the length of the labels), thus stealing as little space from the graph as possible. When using the TeX or PostScript drivers, or similar drivers where formatting information is embedded in the string, `gnuplot` is unable to calculate correctly the width of the string for key positioning. If the key is to be positioned at the left, it may be convenient to use the combination `set key left Left reverse`. The box and gap in the grid will be the width of the literal string. If `splot` is being used to draw contours, the contour labels will be listed in the key. If the alignment of these labels is poor or a different number of decimal places is desired, the label format can be specified. See `set clabel` for details. Examples: This places the key at the default location: set key This disables the key: set nokey This places a key at coordinates 2,3.5,2 in the default (first) coordinate system: set key 2,3.5,2 This places the key below the graph: set key below This places the key in the bottom left corner, left-justifies the text, gives it a title, and draws a box around it in linetype 3: set key left bottom Left title 'Legend' box 3 3 label ?set label ?set nolabel ?show label ?label ?nolabel Arbitrary labels can be placed on the plot using the `set label` command. Syntax: set label {<tag>} {"<label_text>"} {at <position>} {<justification>} {{no}rotate} {font "<name><,size>"} set nolabel {<tag>} show label The <position> is specified by either x,y or x,y,z, and may be preceded by `first`, `second`, `graph`, or `screen` to select the coordinate system. See `coordinates` for details. The tag is an integer that is used to identify the label. If no <tag> is given, the lowest unused tag value is assigned automatically. The tag can be used to delete or modify a specific label. To change any attribute of an existing label, use the `set label` command with the appropriate tag, and specify the parts of the label to be changed. By default, the text is placed flush left against the point x,y,z. To adjust the way the label is positioned with respect to the point x,y,z, add the parameter <justification>, which may be `left`, `right` or `center`, indicating that the point is to be at the left, right or center of the text. Labels outside the plotted boundaries are permitted but may interfere with axis labels or other text. If `rotate` is given, the label is written vertically (if the terminal can do so, of course). If one (or more) axis is timeseries, the appropriate coordinate should be given as a quoted time string according to the `timefmt` format string. See `set xdata` and `set timefmt`. The EEPIC, Imagen, LaTeX, and TPIC drivers allow \\ in a string to specify a newline. Examples: To set a label at (1,2) to "y=x", use: set label "y=x" at 1,2 To set a label of the sign Sigma of size 24 at the center of the graph, use: set label "S" at graph 0.5,0.5 center font "Symbol,24" To set a label "y=x^2" with the right of the text at (2,3,4), and tag the label as number 3, use: set label 3 "y=x^2" at 2,3,4 right To change the preceding label to center justification, use: set label 3 center To delete label number 2, use: set nolabel 2 To delete all labels, use: set nolabel To show all labels (in tag order), use: show label To set a label on a graph with a timeseries on the x axis, use, for example: set timefmt "%d/%m/%y,%H:%M" set label "Harvest" at "25/8/93",1 3 linestyle ?set linestyle ?set nolinestyle ?show linestyle ?linestyle Each terminal has a default set of line and point types, which can be seen by using the command `test`. `set linestyle` defines a set of line types and widths and point types and sizes so that you can refer to them later by an index instead of repeating all the information at each invocation. Syntax: set linestyle <index> {linetype | lt <line_type>} {linewidth | lw <line_width>} {pointtype | pt <point_type>} {pointsize | ps <point_size>} set nolinestyle show linestyle The line and point types are taken from the default types for the terminal currently in use. The line width and point size are multipliers for the default width and size (but note that <point_size> here is unaffected by the multiplier given on 'set pointsize'). The defaults for the line and point types is the index. The defaults for the width and size are both unity. Linestyles created by this mechanism do not replace the default styles; both may be used. Not all terminals support the line width and point size features, so these terminals obviously cannot fully support `set linestyle`. Note that this feature is not completely installed; linestyles defined by this mechanism may be used with 'plot', 'splot', 'replot', and 'set arrow', but not by other commands that allow the default index to be used, such as 'set grid'. Example: Suppose that the default lines for indices 1, 2, and 3 are red, green, and blue, respectively, and the default point shapes for the same indices are a square, a cross, and a triangle, respectively. Then set linestyle 1 lt 2 lw 2 pt 3 ps 0.5 defines a new linestyle that is green and twice the default width and a new pointstyle that is a half-sized triangle. The commands set function style lines plot f(x) lt 3, g(x) ls 1 will create a plot of f(x) using the default blue line and a plot of g(x) using the user-defined wide green line. Similarly the commands set function style linespoints plot p(x) lt 1 pt 3, q(x) ls 1 will create a plot of f(x) using the default triangles connected by a red line and q(x) using small triangles connected by a green line. 3 lmargin ?set lmargin ?lmargin The command `set lmargin` sets the size of the left margin. Please see `set margin` for details. 3 locale ?set locale ?show logscale ?locale The `locale` setting determines the language with which `{x,y,z}{d,m}tics` will write the days and months. Syntax: set locale {"<locale>"} <locale> may be any language designation acceptable to your installation. See your system documentation for the available options. The default value is determined from the LANG environment variable. 3 logscale ?set logscale ?set nologscale ?show logscale ?logscale ?nologscale Log scaling may be set on the x, y, z, x2 and/or y2 axes. Syntax: set logscale <axes> <base> set nologscale <axes> show logscale where <axes> may be any combinations of `x`, `y`, and `z`, in any order, or `x2` or `y2` and where <base> is the base of the log scaling. If <base> is not given, then 10 is assumed. If <axes> is not given, then all axes are assumed. `set nologscale` turns off log scaling for the specified axes. Examples: To enable log scaling in both x and z axes: set logscale xz To enable scaling log base 2 of the y axis: set logscale y 2 To disable z axis log scaling: set nologscale z 3 mapping ?set mapping ?show mapping ?mapping If data are provided to `splot` in spherical or cylindrical coordinates, the `set mapping` command should be used to instruct `gnuplot` how to interpret them. Syntax: set mapping {cartesian | spherical | cylindrical} A cartesian coordinate system is used by default. For a spherical coordinate system, the data occupy two or three columns (or `using` entries). The first two are interpreted as the polar and azimuthal angles theta and phi (in the units specified by `set angles`). The radius r is taken from the third column if there is one, or is set to unity if there is no third column. The mapping is: x = r * cos(theta) * cos(phi) y = r * sin(theta) * cos(phi) z = r * sin(phi) Note that this is a "geographic" spherical system, rather than a "polar" one. For a cylindrical coordinate system, the data again occupy two or three columns. The first two are interpreted as theta (in the units specified by `set angles`) and z. The radius is either taken from the third column or set to unity, as in the spherical case. The mapping is: x = r * cos(theta) y = r * sin(theta) z = z The effects of `mapping` can be duplicated with the `using` filter on the `splot` command, but `mapping` may be more convenient if many data files are to be processed. However even if `mapping` is used, `using` may still be necessary if the data in the file are not in the required order. `mapping` has no effect on `plot`s. ^ <a href="http://www.nas.nasa.gov/~woo/gnuplot/world/world.html">Mapping Demos.</a> 3 margin ?set margin ?show margin ?margin Normally the margins of the plot are automatically calculated based on tics and axis labels. These computed values can be overridden by the `set margin` commands. `show margin` shows the current settings. Syntax: set bmargin {<margin>} set lmargin {<margin>} set rmargin {<margin>} set tmargin {<margin>} show margin The units of <margin> are character heights or widths, as appropriate. A positive value defines the absolute size of the margin. A negative value (or none) causes `gnuplot` to revert to the computed value. 3 missing ?set missing ?missing The `set missing` command allows you to tell `gnuplot` what character is used in a data file to denote missing data. Syntax: set missing {"<character>"} show missing Example: set missing "?" would mean that, when plotting a file containing 1 1 2 ? 3 2 the middle line would be ignored. There is no default character for `missing`. 3 multiplot ?set multiplot ?multiplot ?set nomultiplot The command `set multiplot` places `gnuplot` in the multiplot mode, in which several plots are placed on the same page, window, or screen. Syntax: set multiplot set nomultiplot For some terminals, no plot is displayed until the command `set nomultiplot` is given, which causes the entire page to be drawn and then returns `gnuplot` to its normal single-plot mode. For other terminals, each separate `plot` command produces a plot, but the screen may not be cleared between plots. Any labels or arrows that have been defined will be drawn for each plot according to the current size and origin (unless their coordinates are defined in the `screen` system). Just about everything else that can be `set` is applied to each plot, too. If you want something to appear only once on the page, for instance a single time stamp, you'll need to put a `set time`/`set notime` pair around one of the `plot`, `splot` or `replot` commands within the `set multiplot`/`set nomultiplot` block. The commands `set origin` and `set size` must be used to correctly position each plot; see `set origin` and `set size` for details of their usage. Example: set size 0.7,0.7 set origin 0.1,0.1 set multiplot set size 0.4,0.4 set origin 0.1,0.1 plot sin(x) set size 0.2,0.2 set origin 0.5,0.5 plot cos(x) set nomultiplot displays a plot of cos(x) stacked above a plot of sin(x). Note the initial `set size` and `set origin`. While these are not always required, their inclusion is recommended. Some terminal drivers require that bounding box information be available before any plots can be made, and the form given above guarantees that the bounding box will include the entire plot array rather than just the bounding box of the first plot. `set size` and `set origin` refer to the entire plotting area used for each plot. If you want to have the axes themselves line up, perhaps to avoid having to label all of them, you need to guarantee that the margins are the same size. This can be done with the `set margin` commands. Please see `set margin` for their use. ^ <a href="http://www.nas.nasa.gov/~woo/gnuplot/multiplot/multiplt.html"> See demo. </a> 3 mx2tics ?set mx2tics ?set nomx2tics ?show mx2tics ?mx2tics ?nomx2tics Minor tic marks along the x2 (top) axis are controlled by `set mx2tics`. Please see `set mxtics`. 3 mxtics ?set mxtics ?set nomxtics ?show mxtics ?mxtics ?nomxtics Minor tic marks along the x axis are controlled by `set mxtics`. They can be turned off with `set nomxtics`. Similar commands control minor tics along the other axes. Syntax: set mxtics {<freq> | default} set nomxtics show mxtics The same syntax applies to `mytics`, `mztics`, `mx2tics` and `my2tics`. <freq> is the number of sub-intervals (NOT the number of minor tics) between major tics (ten is the default for a linear axis, so there are nine minor tics between major tics). Selecting `default` will return the number of minor ticks to its default value. If the axis is logarithmic, the number of sub-intervals will be set to a reasonable number by default (based upon the length of a decade). This will be overridden if <freq> is given. However the usual minor tics (2, 3, ..., 8, 9 between 1 and 10, for example) are obtained by setting <freq> to 10, even though there are but nine sub-intervals. Minor tics can be used only with uniformly spaced major tics. Since major tics can be placed arbitrarily by `set {x|x2|y|y2|z}tics`, minor tics cannot be used if major tics are explicitly `set`. By default, minor tics are off for linear axes and on for logarithmic axes. They inherit the settings for `axis|border` and `{no}mirror` specified for the major tics. Please see `set xtics` for information about these. 3 my2tics ?set my2tics ?set nomy2tics ?show my2tics ?my2tics ?nomy2tics Minor tic marks along the y2 (right-hand) axis are controlled by `set my2tics`. Please see `set mxtics`. 3 mytics ?set mytics ?set nomytics ?show mytics ?mytics ?nomytics Minor tic marks along the y axis are controlled by `set mytics`. Please see `set mxtics`. 3 mztics ?set mztics ?set nomztics ?show mztics ?mztics ?nomztics Minor tic marks along the z axis are controlled by `set mztics`. Please see `set mxtics`. 3 offsets ?set offsets ?set nooffsets ?show offsets ?offsets ?nooffsets Offsets provide a mechanism to put a boundary around the data inside of an autoscaled graph. Syntax: set offsets <left>, <right>, <top>, <bottom> set nooffsets show offsets Each offset may be a constant or an expression. Each defaults to 0. Left and right offsets are given in units of the x axis, top and bottom offsets in units of the y axis. A positive offset expands the graph in the specified direction, e.g., a positive bottom offset makes ymin more negative. Negative offsets, while permitted, can have unexpected interactions with autoscaling and clipping. Offsets are ignored in `splot`s. Example: set offsets 0, 0, 2, 2 plot sin(x) This graph of sin(x) will have a y range [-3:3] because the function will be autoscaled to [-1:1] and the vertical offsets are each two. 3 origin ?set origin ?show origin ?origin The `set origin` command is used to specify the origin of a plotting surface (i.e., the graph and its margins) on the screen. The coordinates are given in the `screen` coordinate system (see `coordinates` for information about this system). Syntax: set origin <x-origin>,<y-origin> 3 output ?set output ?show output ?output By default, screens are displayed to the standard output. The `set output` command redirects the display to the specified file or device. Syntax: set output {"<filename>"} show output The filename must be enclosed in quotes. If the filename is omitted, any output file opened by a previous invocation of `set output` will be closed and new output will be sent to STDOUT. (If you give the command `set output "STDOUT"`, your output may be sent to a file named "STDOUT"! ["May be", not "will be", because some terminals, like `x11`, ignore `set output`.]) MSDOS users should note that the \ character has special significance in double-quoted strings, so single-quotes should be used for filenames in different directories. When both `set terminal` and `set output` are used together, it is safest to give `set terminal` first, because some terminals set a flag which is needed in some operating systems. This would be the case, for example, if the operating system needs to know whether or not a file is to be formatted in order to open it properly. On machines with popen functions (Unix), output can be piped through a shell command if the first character of the filename is '|'. For instance, set output "|lpr -Plaser filename" set output "|lp -dlaser filename" On MSDOS machines, `set output "PRN"` will direct the output to the default printer. On VMS, output can be sent directly to any spooled device. It is also possible to send the output to DECnet transparent tasks, which allows some flexibility. 3 parametric ?set parametric ?set noparametric ?show parametric ?parametric ?noparametric The `set parametric` command changes the meaning of `plot` (`splot`) from normal functions to parametric functions. The command `set noparametric` restores the plotting style to normal, single-valued expression plotting. Syntax: set parametric set noparametric show parametric For 2-d plotting, a parametric function is determined by a pair of parametric functions operating on a parameter. An example of a 2-d parametric function would be `plot sin(t),cos(t)`, which draws a circle (if the aspect ratio is set correctly---see `set size`). `gnuplot` will display an error message if both functions are not provided for a parametric `plot`. For 3-d plotting, the surface is described as x=f(u,v), y=g(u,v), z=h(u,v). Therefore a triplet of functions is required. An example of a 3-d parametric function would be `cos(u)*cos(v),cos(u)*sin(v),sin(u)`, which draws a sphere. `gnuplot` will display an error message if all three functions are not provided for a parametric `splot`. The total set of possible plots is a superset of the simple f(x) style plots, since the two functions can describe the x and y values to be computed separately. In fact, plots of the type t,f(t) are equivalent to those produced with f(x) because the x values are computed using the identity function. Similarly, 3-d plots of the type u,v,f(u,v) are equivalent to f(x,y). Note that the order the parametric functions are specified is xfunction, yfunction (and zfunction) and that each operates over the common parametric domain. Also, the `set parametric` function implies a new range of values. Whereas the normal f(x) and f(x,y) style plotting assume an xrange and yrange (and zrange), the parametric mode additionally specifies a trange, urange, and vrange. These ranges may be set directly with `set trange`, `set urange`, and `set vrange`, or by specifying the range on the `plot` or `splot` commands. Currently the default range for these parametric variables is [-5:5]. Setting the ranges to something more meaningful is expected. 3 pointsize ?set pointsize ?show pointsize ?pointsize The `set pointsize` command changes the size of the points used in plots. Syntax: set pointsize <pointsize> show pointsize Default is pointsize 1.0. Larger pointsizes (>1.0) are useful for high resolution in bitmapped graphics. The pointsize of a single plot may be changed on the `plot` command. See `plot with` for details. Please note that the pointsize setting is not supported with all terminal types. 3 polar ?set polar ?set nopolar ?show polar ?polar ?nopolar The `set polar` command changes the meaning of the plot from rectangular coordinates to polar coordinates. Syntax: set polar set nopolar show polar There have been changes made to polar mode in version 3.6, so that scripts for `gnuplot` versions 3.5 and earlier will require modification. The main change is that the dummy variable t is used for the angle so that the x and y ranges can be controlled independently. Other changes are: 1) tics are no longer put along the zero axes automatically ---use `set xtics axis nomirror`; `set ytics axis nomirror`; 2) the grid, if selected, is not automatically polar ---use `set grid polar`; 3) the grid is not labelled with angles ---use `set label` as necessary. In polar coordinates, the dummy variable (t) is an angle. The default range of t is [0:2*pi], or, if degree units have been selected, to [0:360] (see `set angles`). The command `set nopolar` changes the meaning of the plot back to the default rectangular coordinate system. The `set polar` command is not supported for `splot`s. See the `set mapping` command for similar functionality for `splot`s. While in polar coordinates the meaning of an expression in t is really r = f(t), where t is an angle of rotation. The trange controls the domain (the angle) of the function, and the x and y ranges control the range of the graph in the x and y directions. Each of these ranges, as well as the rrange, may be autoscaled or set explicitly. See `set xrange` for details of all the `set range` commands. Example: set polar plot t*sin(t) plot [-2*pi:2*pi] [-3:3] [-3:3] t*sin(t) The first `plot` uses the default polar angular domain of 0 to 2*pi. The radius and the size of the graph are scaled automatically. The second `plot` expands the domain, and restricts the size of the graph to [-3:3] in both directions. You may want to `set size square` to have `gnuplot` try to make the aspect ratio equal to unity, so that circles look circular. ^ <a href="http://www.nas.nasa.gov/~woo/gnuplot/polar/polar.html">Polar demos </a> ^ <a href="http://www.nas.nasa.gov/~woo/gnuplot/poldat/poldat.html">Polar Data Plot. </a> 3 rmargin ?set rmargin ?rmargin The command `set rmargin` sets the size of the right margin. Please see `set margin` for details. 3 rrange ?set rrange ?show rrange ?rrange The `set rrange` command sets the range of the radial coordinate for a graph in polar mode. Please see `set xrange` for details. 3 samples ?set samples ?show samples ?samples The sampling rate of functions may be changed by the `set samples` command. Syntax: set samples <samples_1> {,<samples_2>} show samples By default, sampling is set to 100 points. A higher sampling rate will produce more accurate plots, but will take longer. This parameter has no effect on data-file plotting unless one of the `smooth` options is used. When a 2-d graph is being done, only the value of <samples_1> is relevant. When a surface plot is being done without the removal of hidden lines, the value of samples specifies the number of samples that are to be evaluated for isoline. Each iso-v line will have <sample_1> samples and each iso-u line will have <sample_2> samples. If you only specify <samples_1>, <samples_2> will be set to the same value as <samples_1>. See also `set isosamples`. 3 size ?set size ?show size ?size The `set size` command scales the displayed size of the plot. Syntax: set size {{no}square | ratio <r> | noratio} {<xscale>,<yscale>} show size The <xscale> and <yscale> values are the scaling factors for the size of the plot, which includes the graph and the margins. `ratio` causes `gnuplot` to try to create a graph with an aspect ratio of <r> (the ratio of the y-axis length to the x-axis length) within the portion of the plot specified by <xscale> and <yscale>. The meaning of a negative value for <r> is different. If <r>=-1, gnuplot tries to set the scales so that the unit has the same length on both the x and y axes (suitable for geographical data, for instance). If <r>=-2, the unit on y has twice the length of the unit on x, and so on. The success of `gnuplot` in producing the requested aspect ratio depends on the terminal selected. The graph area will be the largest rectangle of aspect ratio <r> that will fit into the specified portion of the output (leaving adequate margins, of course). `square` is a synonym for `ratio 1`. Both `noratio` and `nosquare` return the graph to its default aspect ratio (1.0), but do not return <xscale> or <yscale> to their default values (also 1.0). `ratio` and `square` have no effect on 3-d plots. `set size` is relative to the default size, which differs from terminal to terminal. Since `gnuplot` fills as much of the available plotting area as possible by default, it is safer to use `set size` to decrease the size of a plot than to increase it. See `set terminal` for the default sizes. On some terminals, changing the size of the plot will result in text being misplaced. Examples: To set the size to normal size use: set size 1,1 To make the graph half size and square use: set size square 0.5,0.5 To make the graph twice as high as wide use: set size ratio 2 ^<a href="http://www.nas.nasa.gov/~woo/gnuplot/airfoil/airfoil.html"> See demo. </a> 3 style ?set function style ?show function style ?set data style ?show data style ?set style ?show style Default styles are chosen with the `set function style` and `set data style` commands. See `plot with` for information about how to override the default plotting style for individual functions and data sets. Syntax: set function style <style> set data style <style> show function style show data style The types used for all line and point styles (i.e., solid, dash-dot, color, etc. for lines; circles, squares, crosses, etc. for points) will be either those specified on the `plot` or `splot` command or will be chosen sequentially from the types available to the terminal in use. Use the command `test` to see what is available. None of the styles requiring more than two columns of information (e.g., `errorbars`) can be used with `splot`s or function `plot`s. Neither `boxes` nor any of the `steps` styles can be used with `splot`s. If an inappropriate style is specified, it will be changed to `points`. For 2-d data with more than two columns, `gnuplot` is picky about the allowed `errorbar` styles. The `using` option on the `plot` command can be used to set up the correct columns for the style you want. (In this discussion, "column" will be used to refer both to a column in the data file and an entry in the `using` list.) For three columns, only `xerrorbars`, `yerrorbars` (or `errorbars`), `boxes`, and `boxerrorbars` are allowed. If another plot style is used, the style will be changed to `yerrorbars`. The `boxerrorbars` style will calculate the boxwidth automatically. For four columns, only `xerrorbars`, `yerrorbars` (or `errorbars`), `xyerrorbars`, `boxxyerrorbars`, and `boxerrorbars` are allowed. An illegal style will be changed to `yerrorbars`. Five-column data allow only the `boxerrorbars`, `financebars`, and `candlesticks` styles. (The last two of these are primarily used for plots of financial prices.) An illegal style will be changed to `boxerrorbars` before plotting. Six- and seven-column data only allow the `xyerrorbars` and `boxxyerrorbars` styles. Illegal styles will be changed to `xyerrorbars` before plotting. For more information about error bars, please see `plot errorbars`. 4 boxerrorbars ?set style boxerrorbars ?style boxerrorbars ?boxerrorbars The `boxerrorbars` style is only relevant to 2-d data plotting. It is a combination of the `boxes` and `yerrorbars` styles. The boxwidth will come from the fourth column if the y errors are in the form of "ydelta" and the boxwidth was not previously set equal to -2.0 (`set boxwidth -2.0`) or from the fifth column if the y errors are in the form of "ylow yhigh". The special case `boxwidth = -2.0` is for four-column data with y errors in the form "ylow yhigh". In this case the boxwidth will be calculated so that each box touches the adjacent boxes. The width will also be calculated in cases where three-column data are used. The box height is determined from the y error in the same way as it is for the `yerrorbars` style---either from y-ydelta to y+ydelta or from ylow to yhigh, depending on how many data columns are provided. ^<a href="http://www.nas.nasa.gov/~woo/gnuplot/errorbar/errorbar.html"> See Demo. </a> 4 boxes ?set style boxes ?style boxes ?boxes ?set style bargraph ?style bargraph ?bargraph The `boxes` style is only relevant to 2-d plotting. It draws a box centered about the given x coordinate from the x axis (not the graph border) to the given y coordinate. The width of the box is obtained in one of three ways. If it is a data plot and the data file has a third column, this will be used to set the width of the box. If not, if a width has been set using the `set boxwidth` command, this will be used. If neither of these is available, the width of each box will be calculated automatically so that it touches the adjacent boxes. 4 boxxyerrorbars ?set style boxxyerrorbars ?style boxxyerrorbars ?boxxyerrorbars The `boxxyerrorbars` style is only relevant to 2-d data plotting. It is a combination of the `boxes` and `xyerrorbars` styles. The box width and height are determined from the x and y errors in the same way as they are for the `xyerrorbars` style---either from xlow to xhigh and from ylow to yhigh, or from x-xdelta to x+xdelta and from y-ydelta to y+ydelta , depending on how many data columns are provided. 4 candlesticks ?set style candlesticks ?style candlesticks ?candlesticks The `candlesticks` style is only relevant for 2-d data plotting of financial data. Five columns of data are required; in order, these should be the x coordinate (most likely a date) and the opening, low, high, and closing prices. The symbol is an open rectangle, centered horizontally at the x coordinate and limited vertically by the opening and closing prices. A vertical line segment at the x coordinate extends up from the top of the rectangle to the high price and another down to the low. The width of the rectangle may be changed by `set bar`. The symbol will be unchanged if the low and high prices are interchanged or if the opening and closing prices are interchanged. See `set bar` and `financebars`. ^<a href="http://www.nas.nasa.gov/~woo/gnuplot/finance/finance.html"> See demos.</a> 4 dots ?set style dots ?style dots ?dots The `dots` style plots a tiny dot at each point; this is useful for scatter plots with many points. 4 financebars ?set style financebars ?style financebars ?financebars The `financebars` style is only relevant for 2-d data plotting of financial data. Five columns of data are required; in order, these should be the x coordinate (most likely a date) and the opening, low, high, and closing prices. The symbol is a vertical line segment, located horizontally at the x coordinate and limited vertically by the high and low prices. A horizontal tic on the left marks the opening price and one on the right marks the closing price. The length of these tics may be changed by `set bar`. The symbol will be unchanged if the high and low prices are interchanged. See `set bar` and `candlesticks`. ^<a href="http://www.nas.nasa.gov/~woo/gnuplot/finance/finance.html"> See demos.</a> 4 fsteps ?set style fsteps ?style fsteps ?fsteps The `fsteps` style is only relevant to 2-d plotting. It connects consecutive points with two line segments: the first from (x1,y1) to (x1,y2) and the second from (x1,y2) to (x2,y2). ^<a href="http://www.nas.nasa.gov/~woo/gnuplot/steps/steps.html"> See demo. </a> 4 histeps ?set style histeps ?style histeps ?histeps The `histeps` style is only relevant to 2-d plotting. It is intended for plotting histograms. Y-values are assumed to be centered at the x-values; the point at x1 is represented as a horizontal line from ((x0+x1)/2,y1) to ((x1+x2)/2,y1). The lines representing the end points are extended so that the step is centered on at x. Adjacent points are connected by a vertical line at their average x, that is, from ((x1+x2)/2,y1) to ((x1+x2)/2,y2). If `autoscale` is in effect, it selects the xrange from the data rather than the steps, so the end points will appear only half as wide as the others. ^<a href="http://www.nas.nasa.gov/~woo/gnuplot/steps/steps.html"> See demo. </a> `histeps` is only a plotting style; `gnuplot` does not have the ability to create bins and determine their population from some data set. 4 impulses ?set style impulses ?style impulses ?impulses The `impulses` style displays a vertical line from the x axis (not the graph border), or from the grid base for `splot`, to each point. 4 lines ?set style lines ?style lines ?lines The `lines` style connects adjacent points with straight line segments. 4 linespoints ?set style linespoints ?set style lp ?style linespoints ?style lp ?linespoints ?lp The `linespoints` style does both `lines` and `points`, that is, it draws a small symbol at each point and then connects adjacent points with straight line segments. The command `set pointsize` may be used to change the size of the points. See `set pointsize` for its usage. `linespoints` may be abbreviated `lp`. 4 points ?set style points ?style points ?points The `points` style displays a small symbol at each point. The command `set pointsize` may be used to change the size of the points. See `set pointsize` for its usage. 4 steps ?set style steps ?style steps ?steps The `steps` style is only relevant to 2-d plotting. It connects consecutive points with two line segments: the first from (x1,y1) to (x2,y1) and the second from (x2,y1) to (x2,y2). ^<a href="http://www.nas.nasa.gov/~woo/gnuplot/steps/steps.html"> See demo. </a> 4 vector ?set style vector ?style vector ?vector The `vector` style draws a vector from (x,y) to (x+xdelta,y+ydelta). Thus it requires four columns of data. It also draws a small arrowhead at the end of the vector. The `vector` style is still experimental: it doesn't get clipped properly and other things may also be wrong with it. Use it at your own risk. 4 xerrorbars ?set style xerrorbars ?style xerrorbars ?xerrorbars The `xerrorbars` style is only relevant to 2-d data plots. `xerrorbars` is like `dots`, except that a horizontal error bar is also drawn. At each point (x,y), a line is drawn from (xlow,y) to (xhigh,y) or from (x-xdelta,y) to (x+xdelta,y), depending on how many data columns are provided. A tic mark is placed at the ends of the error bar (unless `set bar` is used---see `set bar` for details). 4 xyerrorbars ?set style xyerrorbars ?style xyerrorbars ?xyerrorbars The `xyerrorbars` style is only relevant to 2-d data plots. `xyerrorbars` is like `dots`, except that horizontal and vertical error bars are also drawn. At each point (x,y), lines are drawn from (x,y-ydelta) to (x,y+ydelta) and from (x-xdelta,y) to (x+xdelta,y) or from (x,ylow) to (x,yhigh) and from (xlow,y) to (xhigh,y), depending upon the number of data columns provided. A tic mark is placed at the ends of the error bar (unless `set bar` is used---see `set bar` for details). If data are provided in an unsupported mixed form, the `using` filter on the `plot` command should be used to set up the appropriate form. For example, if the data are of the form (x,y,xdelta,ylow,yhigh), then you can use plot 'data' using 1:2:($1-$3),($1+$3),4,5 with xyerrorbars 4 yerrorbars ?set style yerrorbars ?style yerrorbars ?yerrorbars ?set style errorbars ?style errorbars ?errorbars The `yerrorbars` (or `errorbars`) style is only relevant to 2-d data plots. `yerrorbars` is like `dots`, except that a vertical error bar is also drawn. At each point (x,y), a line is drawn from (x,y-ydelta) to (x,y+ydelta) or from (x,ylow) to (x,yhigh), depending on how many data columns are provided. A tic mark is placed at the ends of the error bar (unless `set bar` is used---see `set bar` for details). ^<a href="http://www.nas.nasa.gov/~woo/gnuplot/errorbar/errorbar.html"> See demo. </a> 3 surface ?set surface ?set nosurface ?show surface ?surface ?nosurface The command `set surface` controls the display of surfaces, which are drawn as a mesh of isolines. Syntax: set surface set nosurface show surface Whenever `set nosurface` is issued, no surface isolines/mesh will be drawn. This is useful if contours are to be displayed by themselves. See also `set contour`. ^ <h2> Terminal Types </h2> 3 terminal ?set terminal ?set term ?show terminal ?terminal ?term `gnuplot` supports many different graphics devices. Use `set terminal` to tell `gnuplot` what kind of output to generate. Syntax: set terminal {<terminal-type>} show terminal If <terminal-type> is omitted, `gnuplot` will list the available terminal types. <terminal-type> may be abbreviated. Use `set output` to redirect this output to a file or device. If both `set terminal` and `set output` are used together, it is safest to give `set terminal` first, because some terminals set a flag which is needed in some operating systems. Several terminals have additional options. For example, see `dumb`, `iris4d`, `hpljii` or `postscript`. This document may describe drivers that are not available to you because they were not installed, or it may not describe all the drivers that are available to you, depending on its output format. <4 -- all terminal stuff is pulled from the .trm files 3 tics ?set tics ?show tics ?tics The `set tics` command can be used to change the tics to be drawn outwards. Syntax: set tics {<direction>} show tics where <direction> may be `in` (the default) or `out`. See also `set xtics` for more control of major (labelled) tic marks and `set mxtics` for control of minor tic marks. 3 ticslevel ?set ticslevel ?show ticslevel ?ticslevel Using `splot`, one can adjust the relative height of the vertical (Z) axis using `set ticslevel`. The numeric argument provided specifies the location of the bottom of the scale (as a fraction of the z-range) above the xy-plane. The default value is 0.5. Negative values are permitted, but tic labels on the three axes may overlap. To place the xy-plane at a position 'pos' on the z-axis, `ticslevel` should be set equal to (pos - zmin) / (zmin - zmax). Syntax: set ticslevel {<level>} show tics See also `set view`. 3 ticscale ?set ticscale ?show ticscale ?ticscale The size of the tic marks can be adjusted with `set ticscale`. Syntax: set ticscale {<major> {<minor>}} show tics If <minor> is not specified, it is 0.5*<major>. The default size is 1.0 for major tics and 0.5 for minor tics. Note that it is possible to have the tic marks pointing outward by specifying a negative size. 3 timestamp ?set timestamp ?set time ?set notimestamp ?show timestamp ?timestamp ?notimestamp The command `set timestamp` places the time and date of the plot in the left margin. Syntax: set timestamp {"<format>"} {top|bottom} {{no}rotate} {<xoff>}{,<yoff>} {"<font>"} set notimestamp show timestamp The format string allows you to choose the format used to write the date and time. Its default value is what asctime() uses: "%a %b %d %H:%M:%S %Y" (weekday, month name, day of the month, hours, minutes, seconds, four-digit year). With `top` or `bottom` you can place the timestamp at the top or bottom of the left margin (default: bottom). `rotate` lets you write the timestamp vertically, if your terminal supports vertical text. The constants <xoff> and <off> are offsets from the default position given in character screen coordinates. <font> is used to specify the font with which the time is to be written. The abbreviation `time` may be used in place of `timestamp`. Example: set timestamp "%d/%m/%y %H:%M" 80,-2 "Helvetica" See `set timefmt` for more information about time format strings. 3 timefmt ?set timefmt ?show timefmt ?timefmt This command applies to timeseries where data are composed of dates/times. It has no meaning unless the command `set xdata time` is given also. Syntax: set timefmt "<format string>" show timefmt The string argument tells `gnuplot` how to read timedata from the datafile. The valid formats are: @start table - first is interactive cleartext form Format Explanation %d day of the month, 1--31 %m month of the year, 1--12 %y year, 0--99 %Y year, 4-digit %j day of the year, 1--365 %H hour, 0--24 %M minute, 0--60 %S second, 0--60 %b three-character abbreviation of the name of the month %B name of the month #\multicolumn{3}{|c|}{Format Specifiers}\\ #Format && Explanation \\ \hline #\verb@%d@ && day of the month, 1--31 \\ #\verb@%m@ && month of the year, 1--12 \\ #\verb@%y@ && year, 0--99 \\ #\verb@%Y@ && year, 4-digit \\ #\verb@%j@ && day of the year, 1--365 \\ #\verb@%H@ && hour, 0--24 \\ #\verb@%M@ && minute, 0--60 \\ #\verb@%S@ && second, 0--60 \\ #\verb@%b@ && three-character abbreviation of the name of the month \\ #\verb@%B@ && name of the month \\ %Format@Explanation %_ %%d@day of the month, 1--31 %%m@month of the year, 1--12 %%y@year, 0--99 %%Y@year, 4-digit %%j@day of the year, 1--365 %%H@hour, 0--24 %%M@minute, 0--60 %%S@second, 0--60 %%b@three-character abbreviation of the name of the month %%B@name of the month %_ @end table Any character is allowed in the string, but must match exactly. \t (tab) is recognized. Backslash-octals (\nnn) are converted to char. If there is no separating character between the date/time elements, then %d, %m, %y, %H, %M and %S read two digits each, %Y reads four digits and %j reads three digits. %b requires three characters, and %B requires as many as it needs. Spaces are treated slightly differently. A space in the string stands for zero or more whitespace characters in the file. That is, "%H %M" can be used to read "1220" and "12 20" as well as "12 20". Each set of non-blank characters in the timedata counts as one column in the `using n:n` specification. Thus `11:11 25/12/76 21.0` consists of three columns. To avoid confusion, `gnuplot` requires that you provide a complete `using` specification if your file contains timedata. Since `gnuplot` cannot read non-numerical text, if the date format includes the day or month in words, the format string must exclude this text. But it can still be printed with the "%a", "%A", "%b", or "%B" specifier: see `set format` for more details about these and other options for printing timedata. (`gnuplot` will determine the proper month and weekday from the numerical values.) See also `set xdata` and `Time/date` for more information. Example: set timefmt "%d/%m/%Y\t%H:%M" tells `gnuplot` to read date and time separated by tab. (But look closely at your data---what began as a tab may have been converted to spaces somewhere along the line; the format string must match what is actually in the file.) ^ <a href="http://www.nas.nasa.gov/~woo/gnuplot/timedat/timedat.html"> Time Data Demo </a> 3 title ?set title ?show title ?title The `set title` command produces a plot title that is centered at the top of the plot. `set title` is a special case of `set label`. Syntax: set title {"<title-text>"} {<xoff>}{,<yoff>} {"<font>,{<size>}"} show title Specifying constants <xoff> or <yoff> as optional offsets for the title will move the title <xoff> or <yoff> character screen coordinates (not graph coordinates). For example, "`set title ,-1`" will change only the y offset of the title, moving the title down by roughly the height of one character. <font> is used to specify the font with which the title is to be written; the units of the font <size> depend upon which terminal is used. `set title` with no parameters clears the title. See `syntax` for details about the processing of backslash sequences and the distinction between single- and double-quotes. 3 tmargin ?set tmargin ?tmargin The command `set tmargin` sets the size of the top margin. Please see `set margin` for details. 3 trange ?set trange ?show trange ?trange The `set trange` command sets the parametric range used to compute x and y values when in parametric or polar modes. Please see `set xrange` for details. 3 urange ?set urange ?show urange ?urange The `set urange` and `set vrange` commands set the parametric ranges used to compute x, y, and z values when in `splot` parametric mode. Please see `set xrange` for details. 3 variables ?show variables The `show variables` command lists all user-defined variables and their values. Syntax: show variables 3 view ?set view ?show view ?view The `set view` command sets the viewing angle for `splot`s. It controls how the 3-d coordinates of the plot are mapped into the 2-d screen space. It provides controls for both rotation and scaling of the plotted data, but supports orthographic projections only. Syntax: set view <rot_x> {,{<rot_z>}{,{<scale>}{,<scale_z>}}} show view where <rot_x> and <rot_z> control the rotation angles (in degrees) in a virtual 3-d coordinate system aligned with the screen such that initially (that is, before the rotations are performed) the screen horizontal axis is x, screen vertical axis is y, and the axis perpendicular to the screen is z. The first rotation applied is <rot_x> around the x axis. The second rotation applied is <rot_z> around the new z axis. <rot_x> is bounded to the [0:180] range with a default of 60 degrees, while <rot_z> is bounded to the [0:360] range with a default of 30 degrees. <scale> controls the scaling of the entire `splot`, while <scale_z> scales the z axis only. Both scales default to 1.0. Examples: set view 60, 30, 1, 1 set view ,,0.5 The first sets all the four default values. The second changes only scale, to 0.5. See also `set ticslevel`. 3 vrange ?set vrange ?show vrange ?vrange The `set urange` and `set vrange` commands set the parametric ranges used to compute x, y, and z values when in `splot` parametric mode. Please see `set xrange` for details. 3 x2data ?set x2data ?show x2data ?x2data The `set x2data` command sets data on the x2 (top) axis to timeseries (dates/times). Please see `set xdata`. 3 x2dtics ?set x2dtics ?set nox2dtics ?show x2dtics ?x2dtics ?nox2dtics The `set x2dtics` command changes tics on the x2 (top) axis to days of the week. Please see `set xmtics` for details. 3 x2label ?set x2label ?show x2label ?x2label The `set x2label` command sets the label for the x2 (top) axis. Please see `set xlabel`. 3 x2mtics ?set x2mtics ?set nox2mtics ?show x2mtics ?x2mtics ?nox2mtics The `set x2mtics` command changes tics on the x2 (top) axis to months of the year. Please see `set xmtics` for details. 3 x2range ?set x2range ?show x2range ?x2range The `set x2range` command sets the horizontal range that will be displayed on the x2 (top) axis. Please see `set xrange` for details. 3 x2tics ?set x2tics ?set nox2tics ?show x2tics ?x2tics ?nox2tics The `set x2tics` command controls major (labelled) tics on the x2 (top) axis. Please see `set xtics` for details. 3 x2zeroaxis ?set x2zeroaxis ?set nox2zeroaxis ?show x2zeroaxis ?x2zeroaxis ?nox2zeroaxis The `set x2zeroaxis` command draws a line at the origin of the x2 (top) axis (x2 = 0). For details, please see `set zeroaxis`. 3 xdata ?set xdata ?show xdata ?xdata This command sets the datatype on the x axis to date/time. A similar command does the same thing for each of the other axes. Syntax: set xdata {time} show xdata The same syntax applies to `ydata`, `zdata`, `x2data` and `y2data`. The `time` option signals that the datatype is indeed date/time. If the option is not specified, the datatype reverts to normal. See `set timefmt` to tell `gnuplot` how to read date or time data. The date/time is converted to seconds from start of the century. There is currently only one timefmt, which implies that all the date/time columns must confirm to this format. Specification of ranges should be supplied as quoted strings according to this format to avoid interpretation of the date/time as an expression. The function 'strftime' (type "man strftime" on unix to look it up) is used to print ticmark labels. `gnuplot` tries to figure out a reasonable format for this unless the `set format x "string"` has supplied something that does not look like a decimal format (more than one '%' or neither %f nor %g). See also `Time/date` for more information. 3 xdtics ?set xdtics ?set noxdtics ?show xdtics ?xdtics ?noxdtics The `set xdtics` commands converts the x-axis tic marks to days of the week where 0=Sun and 6=Sat. Overflows are converted modulo 7 to dates. `set noxdtics` returns the labels to their default values. Similar commands do the same things for the other axes. Syntax: set xdtics set noxdtics show xdtics The same syntax applies to `ydtics`, `zdtics`, `x2dtics` and `y2dtics`. See also the `set format` command. 3 xlabel ?set xlabel ?show xlabel ?xlabel The `set xlabel` command sets the x axis label. Similar commands set labels on the other axes. Syntax: set xlabel {"<label>"} {<xoff>}{,<yoff>} {"<font>{,<size>}"} show xlabel The same syntax applies to `x2label`, `ylabel`, `y2label` and `zlabel`. Specifying the constants <xoff> or <yoff> as optional offsets for a label will move it <xoff> or <yoff> character widths or heights. For example, "` set xlabel -1`" will change only the x offset of the xlabel, moving the label roughly one character width to the left. The size of a character depends on both the font and the terminal. <font> is used to specify the font in which the label is written; the units of the font <size> depend upon which terminal is used. To clear a label, put no options on the command line, e.g., "`set y2label`". The default positions of the axis labels are as follows: xlabel: The x-axis label is centered below the bottom axis. ylabel: The position of the y-axis label depends on the terminal, and can be one of the following three positions: 1. Horizontal text flushed left at the top left of the plot. Terminals that cannot rotate text will probably use this method. If `set x2tics` is also in use, the ylabel may overwrite the left-most x2tic label. This may be remedied by adjusting the ylabel position or the left margin. 2. Vertical text centered vertically at the left of the plot. Terminals that can rotate text will probably use this method. 3. Horizontal text centered vertically at the left of the plot. The EEPIC, LaTeX and TPIC drivers use this method. The user must insert line breaks using \\ to prevent the ylabel from overwriting the plot. To produce a vertical row of characters, add \\ between every printing character (but this is ugly). zlabel: The z-axis label is centered along the z axis and placed in the space above the grid level. y2label: The y2-axis label is placed to the right of the y2 axis. The position is terminal-dependent in the same manner as is the y-axis label. x2label: The x2-axis label is placed above the top axis but below the plot title. It is also possible to create an x2-axis label by using new-line characters to make a multi-line plot title, e.g., set title "This is the title\n\nThis is the x2label" Note that double quotes must be used. The same font will be used for both lines, of course. If you are not satisfied with the default position of an axis label, use `set label` instead--that command gives you much more control over where text is placed. Please see `set syntax` for further information about backslash processing and the difference between single- and double-quoted strings. 3 xmtics ?set xmtics ?set noxmtics ?show xmtics ?xmtics ?noxmtics The `set xmtics` commands converts the x-axis tic marks to months of the year where 1=Jan and 12=Dec. Overflows are converted modulo 12 to months. The tics are returned to their default labels by `set noxmtics`. Similar commands perform the same duties for the other axes. Syntax: set xmtics set noxmtics show xmtics The same syntax applies to `x2mtics`, `ymtics`, `y2mtics`, and `zmtics`. See also the `set format` command. 3 xrange ?set xrange ?show xrange ?xrange The `set xrange` command sets the horizontal range that will be displayed. A similar command exists for each of the other axes, as well as for the polar radius r and the parametric variables t, u, and v. Syntax: set xrange [{{<min>}:{<max>}}] {{no}reverse} {{no}writeback} show xrange where <min> and <max> terms are constants, expressions or an asterisk to set autoscaling. If the data are date/time, you must give the range as a quoted string according to the `set timefmt` format. Any value omitted will not be changed. The same syntax applies to `yrange`, `zrange`, `x2range`, `y2range`, `rrange`, `trange`, `urange` and `vrange`. The `reverse` option reverses the direction of the axis, e.g., `set xrange [0:1] reverse` will produce an axis with 1 on the left and 0 on the right. This is identical to the axis produced by `set xrange [1:0]`, of course. `reverse` is intended primarily for use with `autoscale`. The `writeback` option essentially saves the range found by `autoscale` in the buffers that would be filled by `set xrange`. This is useful if you wish to plot several functions together but have the range determined by only some of them. The `writeback` operation is performed during the `plot` execution, so it must be specified before that command. For example, set xrange [-10:10] set yrange [] writeback plot sin(x) set noautoscale y replot x/2 results in a yrange of [-1:1] as found only from the range of sin(x); the [-5:5] range of x/2 is ignored. Executing `show yrange` after each command in the above example should help you understand what is going on. In 2-d, `xrange` and `yrange` determine the extent of the axes, `trange` determines the range of the parametric variable in parametric mode or the range of the angle in polar mode. Similarly in parametric 3-d, `xrange`, `yrange`, and `zrange` govern the axes and `urange` and `vrange` govern the parametric variables. In polar mode, `rrange` determines the radial range plotted. <rmin> acts as an additive constant to the radius, whereas <rmax> acts as a clip to the radius---no point with radius greater than <rmax> will be plotted. `xrange` and `yrange` are affected---the ranges can be set as if the graph was of r(t)-rmin, with rmin added to all the labels. Any range may be partially or totally autoscaled, although it may not make sense to autoscale a parametric variable unless it is plotted with data. Ranges may also be specified on the `plot` command line. A range given on the plot line will be used for that single `plot` command; a range given by a `set` command will be used for all subsequent plots that do not specify their own ranges. The same holds true for `splot`. Examples: To set the xrange to the default: set xrange [-10:10] To set the yrange to increase downwards: set yrange [10:-10] To change zmax to 10 without affecting zmin (which may still be autoscaled): set zrange [:10] To autoscale xmin while leaving xmax unchanged: set xrange [*:] 3 xtics ?set xtics ?set noxtics ?show xtics ?xtics ?noxtics Fine control of the major (labelled) tics on the x axis is possible with the `set xtics` command. The tics may be turned off with the `set noxtics` command, and may be turned on (the default state) with `set xtics`. Similar commands control the major tics on the y, z, x2 and y2 axes. Syntax: set xtics {axis | border} {{no}mirror} {{no}rotate} { <incr> | <start>, <incr> {,<end>} | ({"<label>"} <pos> {,{"<label>"} <pos>}...) } set noxtics show xtics The same syntax applies to `ytics`, `ztics`, `x2tics` and `y2tics`. `axis` or `border` tells `gnuplot` to put the tics (both the tics themselves and the accompanying labels) along the axis or the border, respectively. `mirror` tells it to put unlabelled tics at the same positions on the opposite border. `nomirror` does what you think it does. `rotate` asks `gnuplot` to rotate the text through 90 degrees, if the underlying terminal driver supports text rotation. `norotate` cancels this. The defaults are `border mirror norotate` for tics on the x, y, x2, and y2 axes. For the z axis, the the `{axis | border}` option is not available and the default is `nomirror`. If you do want to mirror the z-axis tics, you might want to create a bit more room for them with `set border`. The positions of the tics may be specified in either of two forms: The <start>, <incr>, <end> form specifies that a series of tics will be plotted on the axis between the values <start> and <end> with an increment of <incr>. If <end> is not given, it is assumed to be infinity. The increment may be negative. If neither <start> nor <end> is given, <start> is assumed to be negative infinity, <end> is assumed to be positive infinity, and the tics will be drawn at multiples of <step>---there will be a tic at zero (if it is within the plotted range). If the axis is logarithmic, the increment will be used as a multiplicative factor. Examples: Make tics at 0, 0.5, 1, 1.5, ..., 9.5, 10. set xtics 0,.5,10 Make tics at ..., -10, -5, 0, 5, 10, ... set xtics 5 Make tics at 1, 100, 1e4, 1e6, 1e8. set logscale x; set xtics 1,100,10e8 The ("<label>" <pos>, ...) form allows arbitrary tic positions or non-numeric tic labels. A set of tics is a set of positions, each with its own optional label. Note that the label is a string enclosed by quotes, and may be a constant string, such as "hello", or contain formatting information for the tic number (which is the same as the position), such as "%3f clients". See `set format` for more information about this case. The label may be made empty by specifying it as an empty string. If no string is given, the default label (numerical) is used. In this form, the tics do not need to be listed in numerical order. Examples: set xtics ("low" 0, "medium" 50, "high" 100) set xtics (1,2,4,8,16,32,64,128,256,512,1024) set ytics ("bottom" 0, "" 10, "top" 20) In the second example, all tics are labelled. In the third, only the end tics are labelled. Tics will only be plotted when in range. Minor (unlabelled) tics can be added by the `set mxtics` command. In case of timeseries data, position values must be given as quoted dates or times according to the format `timefmt`. If the <start>, <incr>, <end> form is used, <start> and <end> must be given according to `timefmt`, but <incr> must be in seconds. Times will be written out according to the format given on "set format", however. Examples: set xdata time set timefmt "%d/%m" set format x "%b %d" set xrange ["00/12":"06/12"] set xtics "01/12", 172800, "05/12" set xdata time set timefmt "%d/%m" set format x "%b %d" set xrange ["00/12":"06/12"] set xtics ("01/12", "" "03/12", "05/12") Both of these will produce tics "Dec 1", "Dec 3", and "Dec 5", but in the second example the tic at "Dec 3" will be unlabelled. 3 xzeroaxis ?set xzeroaxis ?set noxzeroaxis ?show xzeroaxis ?xzeroaxis ?noxzeroaxis The `set xzeroaxis` command draws a line at x = 0. For details, please see `set zeroaxis`. 3 y2data ?set y2data ?show y2data ?y2data The `set y2data` command sets y2 (right-hand) axis data to timeseries (dates/times). Please see `set xdata`. 3 y2dtics ?set y2dtics ?set noy2dtics ?show y2dtics ?y2dtics ?noy2dtics The `set y2dtics` command changes tics on the y2 (right-hand) axis to days of the week. Please see `set xmtics` for details. 3 y2label ?set y2label ?show y2label ?y2label The `set y2dtics` command sets the label for the y2 (right-hand) axis. Please see `set xlabel`. 3 y2mtics ?set y2mtics ?set noy2mtics ?show y2mtics ?y2mtics ?noy2mtics The `set y2mtics` command changes tics on the y2 (right-hand) axis to months of the year. Please see `set xmtics` for details. 3 y2range ?set y2range ?show y2range ?y2range The `set y2range` command sets the vertical range that will be displayed on the y2 (right-hand) axis. Please see `set xrange` for details. 3 y2tics ?set y2tics ?set noy2tics ?show y2tics ?y2tics ?noy2tics The `set y2tics` command controls major (labelled) tics on the y2 (right-hand) axis. Please see `set xtics` for details. 3 y2zeroaxis ?set y2zeroaxis ?set noy2zeroaxis ?show y2zeroaxis ?y2zeroaxis ?noy2zeroaxis The `set y2zeroaxis` command draws a line at the origin of the y2 (right-hand) axis (y2 = 0). For details, please see `set zeroaxis`. 3 ydata ?set ydata ?show ydata ?ydata Sets y-axis data to timeseries (dates/times). Please see `set xdata`. 3 ydtics ?set ydtics ?set noydtics ?show ydtics ?ydtics ?noydtics The `set ydtics` command changes tics on the y axis to days of the week. Please see `set xmtics` for details. 3 ylabel ?set ylabel ?show ylabel ?ylabel This command sets the label for the y axis. Please see `set xlabel`. 3 ymtics ?set ymtics ?set noymtics ?show ymtics ?ymtics ?noymtics The `set ymtics` command changes tics on the y axis to months of the year. Please see `set xmtics` for details. 3 yrange ?set yrange ?show yrange ?yrange The `set yrange` command sets the vertical range that will be displayed on the y axis. Please see `set xrange` for details. 3 ytics ?set ytics ?set noytics ?show ytics ?ytics ?noytics The `set ytics` command controls major (labelled) tics on the y axis. Please see `set xtics` for details. 3 yzeroaxis ?set yzeroaxis ?set noyzeroaxis ?show yzeroaxis ?yzeroaxis ?noyzeroaxis The `set yzeroaxis` command draws a line at y = 0. For details, please see `set zeroaxis`. 3 zdata ?set zdata ?show zdata ?zdata Set zaxis date to timeseries (dates/times). Please see `set xdata`. 3 zdtics ?set zdtics ?set nozdtics ?show zdtics ?zdtics ?nozdtics The `set zdtics` command changes tics on the z axis to days of the week. Please see `set xmtics` for details. 3 zero ?set zero ?show zero ?zero The `zero` value is the default threshold for values approaching 0.0. Syntax: set zero <expression> show zero `gnuplot` will not plot a point if its imaginary part is greater in magnitude than the `zero` threshold. Axis ranges cannot be less than `zero`. The default `zero` value is 1e-8. 3 zeroaxis ?set zeroaxis ?set nozeroaxis ?show zeroaxis ?zeroaxis ?nozeroaxis The x axis may be drawn by `set xzeroaxis` and removed by `set noxzeroaxis`. Similar commands behave similarly for the y, x2, and y2 axes. Syntax: set zeroaxis {<linetype>} set xzeroaxis {<linetype>} set yzeroaxis {<linetype>} set x2zeroaxis {<linetype>} set y2zeroaxis {<linetype>} set nozeroaxis set noxzeroaxis etc. show zeroaxis show xzeroaxis etc. By default, these options are off. The selected zero axis is drawn with a line of type <linetype> from the default linetype list provided by the terminal; user-defined linetypes (via the `set linestyle` command) are not accessible for these axes. If <linetype> is not specified, any zero axes selected will be drawn using the axis linetype (linetype 0). `set zeroaxis l` is equivalent to `set xzeroaxis l; set yzeroaxis l`. `set nozeroaxis` is equivalent to `set noxzeroaxis; set noyzeroaxis`. 3 zlabel ?set zlabel ?show zlabel ?zlabel This command sets the label for the z axis. Please see `set xlabel`. 3 zmtics ?set zmtics ?set nozmtics ?show zmtics ?zmtics ?nozmtics The `set zmtics` command changes tics on the z axis to months of the year. Please see `set xmtics` for details. 3 zrange ?set zrange ?show zrange ?zrange The `set zrange` command sets the range that will be displayed on the z axis. The zrange is used only by `splot` and is ignored by `plot`. Please see `set xrange` for details. 3 ztics ?set ztics ?set noztics ?show ztics ?ztics ?noztics The `set ztics` command controls major (labelled) tics on the z axis. Please see `set xtics` for details. 2 shell ?shell The `shell` command spawns an interactive shell. To return to `gnuplot`, type `logout` if using VMS, `exit` or the END-OF-FILE character if using Unix, `endcli` if using AmigaDOS, or `exit` if using MS-DOS or OS/2. A single shell command may be spawned by preceding it with the ! character ($ if using VMS) at the beginning of a command line. Control will return immediately to `gnuplot` after this command is executed. For example, in Unix, AmigaDOS, MS-DOS or OS/2, ! dir prints a directory listing and then returns to `gnuplot`. On an Atari, the `!` command first checks whether a shell is already loaded and uses it, if available. This is practical if `gnuplot` is run from `gulam`, for example. 2 splot ?splot `splot` is the primary command for drawing 3-d plots (well, actually projections on a 2-d surface, but you knew that). It can create a plot from functions or data in a manner very similar to the `plot` command. Please see `plot` for features common to the `plot` command; only differences are discussed in detail here. Syntax: splot {<ranges>} {<function> | {"<datafile>" {datafile-modifiers}}} {<title-spec>} {with <style>} {, {definitions,} <function> ...} where either a <function> or the name of a data file enclosed in quotes is supplied. A function is a mathematical expression, or a triple (`splot`) of mathematical expressions in parametric mode. By default `splot` draws the xy plane completely below the plotted data. The offset between the lowest ztic and the xy plane can be changed by `set ticslevel`. The orientation of a 'splot' is controlled by `set view`. See `set view` and `set ticslevel` for more information. The syntax for setting ranges on the `splot` command is the same as for `plot`. In non-parametric mode, the order in which ranges must be given is `xrange`, `yrange`, and `zrange`. In parametric mode, the order is `urange`, `vrange`, `xrange`, `yrange`, and `zrange`. The `title` option is the same as in `plot`. The operation of `with` is also the same as in `plot`, except that the plotting styles available to `splot` are limited to `lines`, `points`, `linespoints`, `dots`, and `impulses`; the error-bar capabilities of `plot` are not available for `splot`. The datafile options have more differences. 3 data-file ?splot data-file ?splot datafile Discrete data contained in a file can be displayed by specifying the name of the data file (enclosed in quotes) on the `plot` or `splot` command line. Syntax: splot '<file_name>' {binary | matrix} {index <index list>} {every <every list>} {using <using list>} The special filenames `""` and `"-"` are permitted, as in `plot`. In brief, `binary` indicates that the file is binary, `matrix` indicates that the data are in matrix form, `index` selects which data sets in a multi-data-set file are to be plotted, `every` specifies which datalines within a single data set are to be plotted, and `using` determines how the columns within a single record are to be interpreted. The options `index` and `every` behave the same way as with `plot`. `using` also does, with the obvious difference that the `using` list must provide three entries instead of two. The `plot` options `thru` and `smooth` are not available for `splot`. Data file organization is essentially the same as for `plot`, except that each point is an (x,y,z) triple. If only a single value is provided, it will be used for z, the data point number will be used for x, and the y-isoline number will be used for y; thus "`splot 'file' using 1`" is identical to "`splot 'file' using 0:-1:1`". If two values are provided, `gnuplot` gives you an error message. Three values are interpreted as an (x,y,z) triple. Additional values are generally used as errors, which can be used by `fit`. Single blank records separate datalines (which are interpreted as y-isolines) in a `splot` datafile. No line will join points separated by a blank record. If all datalines contain the same number of points,`gnuplot` will draw cross-isolines in the opposite direction. This is termed "grid data", and is required for drawing a surface, for contouring (`set contour`) and hidden-line removal (`set hidden3d`). It is no longer necessary to specify `parametric` mode for three-column `splot`s. 4 binary ?splot data-file binary ?splot datafile binary ?splot binary ?data-file binary ?datafile binary ?binary ?binary data ?binary files In previous versions, `gnuplot` dynamically detected binary data files. It is now necessary to specify the keyword `binary` directly after the filename. Single precision floats are stored in a binary file as follows: <N+1> <y0> <y1> <y2> ... <yN> <x0> <z0,0> <z0,1> <z0,2> ... <z0,N> <x1> <z1,0> <z1,1> <z1,2> ... <z1,N> : : : : ... : which are converted into triplets: <x0> <y0> <z0,0> <x0> <y1> <z0,1> <x0> <y2> <z0,2> : : : <x0> <yN> <z0,N> <x1> <y0> <z1,0> <x1> <y1> <z1,1> : : : These triplets are then converted into `gnuplot` iso-curves and then `gnuplot` proceeds in the usual manner to do the rest of the plotting. A collection of matrix and vector manipulation routines (in C) is provided in `binary.c`. The routine to write binary data is int fwrite_matrix(file,m,nrl,nrl,ncl,nch,row_title,column_title) An example of using these routines is provided in the file `bf_test.c`, which generates binary files for the demo file `demo/binary.dem`. The `index` keyword is not supported, since the file format allows only one surface per file. The `every` and `using` filters are supported. `using` operates as if the data were read in the above triplet form. ^ <a href="http://www.nas.nasa.gov/~woo/gnuplot/binary/binary.html">Binary File Splot Demo.</a> 4 example datafile ?splot data-file example ?splot datafile example ?splot example A simple example of plotting a 3-d data file is splot 'datafile.dat' where the file "datafile.dat" might contain: # The valley of the Gnu. 0 0 10 0 1 10 0 2 10 1 0 10 1 1 5 1 2 10 2 0 10 2 1 1 2 2 10 3 0 10 3 1 0 3 2 10 Note that "datafile.dat" defines a 4 by 3 grid ( 4 rows of 3 points each ). Rows are separated by blank records. ^ <img align=bottom src="http://www.nas.nasa.gov/~woo/gnuplot/doc/splot.gif" alt="[splot.gif]" width=640 height=480> Note also that the x value is held constant within each dataline. If you instead keep y constant, and plot with hidden-line removal enabled, you will find that the surface is drawn 'inside-out'. Actually for grid data it is not necessary to keep the x values constant within an dataline, nor is it necessary to keep the y values the same along the perpendicular datalines. `gnuplot` requires only that the number of points be the same for each dataline. 4 matrix ?splot data-file matrix ?splot datafile matrix ?splot matrix ?data-file matrix ?datafile matrix ?matrix The `matrix` flag indicates that the data are stored in matrix format. In its present implementation the z-values are read in a row at a time, i. e., z11 z12 z13 z14 ... z21 z22 z23 z24 ... z31 z32 z33 z34 ... and so forth. The row and column indices are used for the x- and y-values. used as x, y, and z. 2 test ?test `test` creates a display of line and point styles and other useful things appropriate for the terminal you are using. Syntax: test 2 update ?update This command writes the current values of the fit parameters into the given file, which is formatted as an initial-value file (as described in the `fit` section). This is useful for saving the current values for later use or for restarting a converged or stopped fit. Syntax: update <filename> {<filename>} If the file already exists, `gnuplot` first renames it by appending `.old` and then opens a new file. That is, "`update 'fred'`" behaves the same way as "`!rename fred fred.old; update 'fred.old' 'fred'`". [On DOS and other systems that use the twelve-character "filename.ext" naming convention, "ext" will be "`old`" and "filename" will be related (hopefully recognizably) to the initial name. Renaming is not done at all on VMS systems, since they use file-versioning.] If a second filename is supplied, the updated values are written to this file instead, and the original parameter file is left unmodified. Please see `fit` for more information. 1 Graphical User Interfaces ?graphical user interfaces ?gui's Several graphical user interfaces have been written for `gnuplot` and one for win32 is included in this distribution. In addition, there is a Macintosh interface at ^<a href="ftp://ftp.ee.gatech.edu/pub/mac/gnuplot"> ftp://ftp.ee.gatech.edu/pub/mac/gnuplot ^</a> and several X11 interfaces include three Tcl/Tk located at the usual Tcl/Tk repositories. 1 Bugs ?bugs The bessel functions do not work for complex arguments. The gamma function does not work for complex arguments. There is a bug in the stdio library for old Sun operating systems (SunOS Sys4-3.2). The "%g" format for 'printf' sometimes incorrectly prints numbers (e.g., 200000.0 as "2"). Thus, tic mark labels may be incorrect on a Sun4 version of `gnuplot`. A work-around is to rescale the data or use the `set format` command to change the tic mark format to "%7.0f" or some other appropriate format. This appears to have been fixed in SunOS 4.0. Another bug: On a Sun3 under SunOS 4.0, and on Sun4's under Sys4-3.2 and SunOS 4.0, the 'sscanf' routine incorrectly parses "00 12" with the format "%f %f" and reads 0 and 0 instead of 0 and 12. This affects data input. If the data file contains x coordinates that are zero but are specified like '00', '000', etc, then you will read the wrong y values. Check any data files or upgrade the SunOS. It appears to have been fixed in SunOS 4.1.1. Suns appear to overflow when calculating exp(-x) for large x, so `gnuplot` gets an undefined result. One work-around is to make a user-defined function like e(x) = x<-500 ? 0 : exp(x). This affects plots of Gaussians (exp(-x*x)) in particular, since x*x grows quite rapidly. Microsoft C 5.1 has a nasty bug associated with the %g format for 'printf'. When any of the formats "%.2g", "%.1g", "%.0g", "%.g" are used, 'printf' will incorrectly print numbers in the range 1e-4 to 1e-1. Numbers that should be printed in the %e format are incorrectly printed in the %f format, with the wrong number of zeros after the decimal point. To work around this problem, use the %e or %f formats explicitly. `gnuplot`, when compiled with Microsoft C, did not work correctly on two VGA displays that were tested. The CGA, EGA and VGA drivers should probably be rewritten to use the Microsoft C graphics library. `gnuplot` compiled with Borland C++ uses the Turbo C graphics drivers and does work correctly with VGA displays. VAX/VMS 4.7 C compiler release 2.4 also has a poorly implemented %g format for 'printf'. The numbers are printed numerically correct, but may not be in the requested format. The K&R second edition says that for the %g format, %e is used if the exponent is less than -4 or greater than or equal to the precision. The VAX uses %e format if the exponent is less than -1. The VAX appears to take no notice of the precision when deciding whether to use %e or %f for numbers less than 1. To work around this problem, use the %e or %f formats explicitly. From the VAX C 2.4 release notes: e,E,f,F,g,G Result will always contain a decimal point. For g and G, trailing zeros will not be removed from the result. VAX/VMS 5.2 C compiler release 3.0 has a slightly better implemented %g format than release 2.4, but not much. Trailing decimal points are now removed, but trailing zeros are still not removed from %g numbers in exponential format. The two preceding problems are actually in the libraries rather than in the compilers. Thus the problems will occur whether `gnuplot` is built using either the DEC compiler or some other one (e.g. the latest gcc). ULTRIX X11R3 has a bug that causes the X11 driver to display "every other" graph. The bug seems to be fixed in DEC's release of X11R4 so newer releases of ULTRIX don't seem to have the problem. Solutions for older sites include upgrading the X11 libraries (from DEC or direct from MIT) or defining ULTRIX_KLUDGE when compiling the x11.trm file. Note that the kludge is not an ideal fix, however. The constant HUGE was incorrectly defined in the NeXT OS 2.0 operating system. HUGE should be set to 1e38 in plot.h. This error has been corrected in the 2.1 version of NeXT OS. Some older models of HP plotters do not have a page eject command 'PG'. The current HPGL driver uses this command in HPGL_reset. This may need to be removed for these plotters. The current PCL5 driver uses HPGL/2 for text as well as graphics. This should be modified to use scalable PCL fonts. On the Atari version, it is not possible to send output directly to the printer (using `/dev/lp` as output file), since CRs are added to LFs in binary output. As a work-around, write the output to a file and copy it to the printer afterwards using a shell command. On AIX 4, the literal 'NaNq' in a datafile causes the special internal value 'not-a-number' to be stored, rather than setting an internal 'undefined' flag. A workaround is to use `set missing 'NaNq'`. There may be an up-to-date list of bugs since the release on the WWW page: http://www.cs.dartmouth.edu/gnuplot Please report any bugs to bug-gnuplot@dartmouth.edu.