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chisl(3P)

NAME

chisl - solve the linear system Ax = b for a Hermitian matrix A, which has been UDU-factored by xHICO or xHIFA, and vectors b and x. 

SYNOPSIS

CALL ZHISL (ZA, LDA, N, IPIVOT, ZB)

CALL CHISL (CA, LDA, N, IPIVOT, CB)

void zhisl(doublecomplex ∗za, long int lda, long int n,
long int ∗ipivot, doublecomplex ∗b)

void chisl(complex ∗ca, long int lda, long int n,
long int ∗ipivot, complex ∗b)

ARGUMENTS

xAUDU factorization of the matrix A, as computed by xHICO or xHIFA. 

LDALeading dimension of the array A as specified in a dimension or type statement.  LDA >= max(1,N). 

NOrder of the matrix A.  N >= 0. 

IPIVOTPivot vector as computed by xHICO or xHIFA. 

xBOn entry, the right-hand side vector b. 
On exit, the solution vector x.

SAMPLE PROGRAM

 
      PROGRAM TEST
      IMPLICIT NONE
C
      INTEGER    LDA, N
      PARAMETER (N = 3)
      PARAMETER (LDA = 3)
C
      REAL       RCOND
      COMPLEX    A(LDA,N), B(N), WORK(N)
      INTEGER    ICOL, IPIVOT(N), IROW
C
      EXTERNAL   CHICO, CHISL
      INTRINSIC  CONJG
C
C     Initialize the array A to store the matrix A shown below.
C     Initialize the array B to store the vector b shown below.
C
C          1    1+2i  1+2i         95-180i
C     A = 1+2i   6   -2+6i    b = 545-118i
C         1+2i -2+6i   11         865+ 62i
C
      DATA A / (1.0,0.0), (8E8,8E8),  (8E8,8E8),
     $        (1.0,-2.0), (6.0,0.0),  (8E8,8E8),
     $        (1.0,-2.0), (6.0,-2.0), (11.0,0.0) /
      DATA B / (95.0,-180.0), (545.0,-118.0), (865.0,62.0) /
C
      PRINT 1000
      DO 100, IROW = 1, N
        PRINT 1010, (CONJG(A(ICOL,IROW)), ICOL = 1, IROW),
     $              (A(IROW,ICOL), ICOL = IROW + 1, N)
  100 CONTINUE
      PRINT 1020
      DO 110, IROW = 1, N
        PRINT 1010, (A(IROW,ICOL), ICOL = 1, N)
  110 CONTINUE
      PRINT 1030
      PRINT 1040, B
      CALL CHICO (A, LDA, N, IPIVOT, RCOND, WORK)
      PRINT 1050, RCOND
      IF ((RCOND + 1.0) .EQ. 1.0) THEN
        PRINT 1060
      END IF
      CALL CHISL (A, LDA, N, IPIVOT, B)
      PRINT 1070
      PRINT 1040, B
C
 1000 FORMAT (1X, ’A in full form:’)
 1010 FORMAT (4(: 3X, ’(’, F4.1, ’,’, F4.1, ’)’))
 1020 FORMAT (/1X, ’A in Hermitian form:  (∗ in unused elements)’)
 1030 FORMAT (/1X, ’b:’)
 1040 FORMAT (3X, ’(’, F6.1, ’,’, F6.1, ’)’)
 1050 FORMAT (/1X, ’Reciprocal condition number of A:’, F6.3)
 1060 FORMAT (1X, ’A may be singular to working precision.’)
 1070 FORMAT (/1X, ’A∗∗(-1) ∗ b:’)
C
      END

SAMPLE OUTPUT

 
 A in full form:
   ( 1.0, 0.0)   ( 1.0,-2.0)   ( 1.0,-2.0)
   ( 1.0, 2.0)   ( 6.0, 0.0)   ( 6.0,-2.0)
   ( 1.0, 2.0)   ( 6.0, 2.0)   (11.0, 0.0)
 
 A in Hermitian form:  (∗ in unused elements)
   ( 1.0, 0.0)   ( 1.0,-2.0)   ( 1.0,-2.0)
   (∗∗∗∗,∗∗∗∗)   ( 6.0, 0.0)   ( 6.0,-2.0)
   (∗∗∗∗,∗∗∗∗)   (∗∗∗∗,∗∗∗∗)   (11.0, 0.0)
 
 b:
   (  95.0,-180.0)
   ( 545.0,-118.0)
   ( 865.0,  62.0)
 
 Reciprocal condition number of A: 0.001
 
 A∗∗(-1) ∗ b:
   (   5.0,   0.0)
   (  26.0,   0.0)
   (  64.0,   0.0)

Sun, Inc.  —  Last change: 20 Sep 1996

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