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- DDDDSSSSPPPPFFFFAAAA((((3333FFFF)))) DDDDSSSSPPPPFFFFAAAA((((3333FFFF))))
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- NNNNAAAAMMMMEEEE
- DSPFA - DSPFA factors a double precision symmetric matrix stored in
- packed form by elimination with symmetric pivoting.
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- To solve A*X = B , follow DSPFA by DSPSL. To compute INVERSE(A)*C ,
- follow DSPFA by DSPSL. To compute DETERMINANT(A) , follow DSPFA by
- DSPDI. To compute INERTIA(A) , follow DSPFA by DSPDI. To compute
- INVERSE(A) , follow DSPFA by DSPDI.
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- SSSSYYYYNNNNOOOOPPPPSSSSYYYYSSSS
- SUBROUTINE DSPFA(AP,N,KPVT,INFO)
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- DDDDEEEESSSSCCCCRRRRIIIIPPPPTTTTIIIIOOOONNNN
- On Entry
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- AAAAPPPP DOUBLE PRECISION (N*(N+1)/2)
- the packed form of a symmetric matrix A . The
- columns of the upper triangle are stored sequentially
- in a one-dimensional array of length N*(N+1)/2 .
- See comments below for details.
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- NNNN INTEGER
- the order of the matrix A . Output
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- AAAAPPPP a block diagonal matrix and the multipliers which
- were used to obtain it stored in packed form.
- The factorization can be written A = U*D*TRANS(U)
- where U is a product of permutation and unit
- upper triangular matrices, TRANS(U) is the
- transpose of U , and D is block diagonal
- with 1 by 1 and 2 by 2 blocks.
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- KKKKPPPPVVVVTTTT INTEGER(N)
- an integer vector of pivot indices.
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- IIIINNNNFFFFOOOO INTEGER
- = 0 normal value.
- = K if the K-th pivot block is singular. This is
- not an error condition for this subroutine,
- but it does indicate that DSPSL or DSPDI may
- divide by zero if called. Packed Storage The following program
- segment will pack the upper triangle of a symmetric matrix.
- K = 0
- DO 20 J = 1, N
- DO 10 I = 1, J
- K = K + 1
- AP(K) = A(I,J)
- 10 CONTINUE
- 20 CONTINUE LINPACK. This version dated 08/14/78 . James Bunch,
- Univ. Calif. San Diego, Argonne Nat. Lab. Subroutines and Functions BLAS
- DAXPY,DSWAP,IDAMAX Fortran DABS,DMAX1,DSQRT
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- PPPPaaaaggggeeee 1111
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