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- Newsgroups: sci.logic
- Path: sparky!uunet!comp.vuw.ac.nz!canterbury.ac.nz!math!wft
- From: wft@math.canterbury.ac.nz (Bill Taylor)
- Subject: Foundations without foundationalism.
- Message-ID: <C1HvBI.D9M@cantua.canterbury.ac.nz>
- Nntp-Posting-Host: sss330.canterbury.ac.nz
- Organization: Department of Mathematics, University of Canterbury
- Date: Wed, 27 Jan 1993 04:04:30 GMT
- Lines: 56
-
- "Foundations without foundationalism"; by Stewart Shapiro.
-
- Many thanks to all those who have recommended this book in sci.logic, over the
- last few months. (Franzen & Zeleny come to mind, but there have been others too.)
-
- I have finally got around to reading it, and have thoroughly enjoyed it; a
- nice mix of technical results and philosophical comment. No doubt large amounts
- of it have passed me by, but it leaves me with the feeling that I am better
- informed on the matters in question, so to that extent at least it is a success.
- It also leaves one with the pleasant feeling that there is more to be discovered
- on a re-read, in due course.
-
- I particularly liked seeing defended in print, the "heretical doctrine" that first-order logic is *not necessarily* the be-all and end-all in logic.
- It is nice indeed, merely to have the view expressed that it may be a good
- idea to "shop around" for the most convenient logic for one's needs. That
- there may not *be* a "one true logic" suitable for all rational thought. Shapiro
- stresses the point that this is especially true of mathematics, which might
- often be better treated by 2nd-order logic. (There is no actual comment, but a
- feeling in the book that there *is* still a "one true math" that is to be
- handled by logic, at least as far as arithmetic and analysis go !)
-
- It is nice to see a downplaying of the oft-quoted Lowenheim-Skolem results,
- which are treated almost as an artefact of the first-order method, rather than
- as significant mathematical results. Indeed it was nice to see stated explicitly,
- that one of these, ("downward" L-S), actually needs the use of AC in the
- metatheory to derive it:- something that had not been impressed on me before,
- and which may be thought to lessen the significance of the results in themselves.
-
- Contrariwise, it is interesting to see the point thoroughly developed that the
- 2nd-order axiomatizations of arithmetic & analysis are *categorical*, a concept
- quite dear to the typical mathematician.
-
- Dearer, at least, than the (also downplayed) concept of *completeness* which
- Shapiro identifies as the chief reason that 1st-order logic has been traditionally
- accepted as standard. It is nice to see completeness removed from its centre
- stage position. I've never been madly impressed with it in a mathematical
- context anyway; partly because the Godel-incompleteness of mathematical theories
- seems to reduce the importance of logical completeness of 1st-orderness; but
- mostly because 1st-order completeness is largely a matter concerning *all*
- possible models, whereas in arithmetic and analysis only *one* model is ever of
- major concern, (though it is now doubtful if the same could be so confidently
- said of set theory, in view of the plethora of independence results).
-
- Anyway, all these matters are handled competently and thoroughly, it seemed to
- me, in Shapiro's book. All in all, a good read. Thanks again to all those who
- helped bring it to my attention.
-
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- Bill Taylor wft@math.canterbury.ac.nz
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- Kleeneness is next to Godelness.
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