sspr, dspr, chpr, zhpr 

Rank-one update of a symmetric or hermitian matrix stored in packed form

FORMAT

  {S,D}SPR (uplo, n, alpha, x, incx, ap) {C,Z}HPR (uplo, n, alpha, x, incx,
  ap)

Arguments

  uplo                character*1
                      On entry, specifies whether the upper- or lower-
                      triangular part of the matrix A is supplied in the
                      packed array AP:

                      If uplo = 'U' or 'u', the upper-triangular part of A is
                      supplied.

                      If uplo = 'L' or 'l', the lower-triangular part of A is
                      supplied.
                      On exit, uplo is unchanged.

  n                   integer*4
                      On entry, the order of the matrix A; n >= 0.
                      On exit, n is unchanged.

  alpha               real*4 | real*8 | complex*8 | complex*16
                      On entry, the scalar alpha*.
                      On exit, alpha is unchanged.

  x                   real*4 | real*8 | complex*8 | complex*16
                      On entry, a one-dimensional array X of length at least
                      (1+(n-1)*|incx|).  Array X contains the vector x.
                      On exit, x is unchanged.

  incx                integer*4
                      On entry, the increment for the elements of X; incx
                      must not equal zero.
                      On exit, incx is unchanged.

  ap                  real*4 | real*8 | complex*8 | complex*16
                      On entry, a one-dimensional array AP of length at least
                      n(n + 1)/2

  If uplo specifies the upper triangular part of the matrix A, the array
  contains those elements of the matrix, packed sequentially, column by
  column, so that AP(1) contains a(11), AP(2) and AP(3) contain a(12) and
  a(22) respectively, and so on.

  If uplo specifies the lower triangular part to the matrix A, the array
  contains those elements of the matrix, also packed sequentially, so that
  AP(1) contains a(11), AP(2) and AP(3) contain a(21) and a(31) respectively,
  and so on.

  For CHPR and ZHPR routines, the imaginary parts of the diagonal elements
  are not accessed, need not be set, and are assumed to be zero.

  On exit, ap is overwritten by the specified part of the updated matrix.

Description

  SSPR and DSPR perform the rank-one update of a real symmetric matrix stored
  in packed form: A  =  alpha*x*transp(x) + A

  CHPR and ZHPR perform the rank-one update of a complex Hermitian matrix
  stored in packed form: A  =  alpha*x*conjug_transp(x) + A

  alpha is a scalar, x is vector with n elements, and A is an n by n matrix
  in packed form. In the case of SSPR and DSPR, matrix A is a symmetric
  matrix and in the case of CHPR and ZHPR, matrix A is a Hermitian matrix.

Example

  REAL*8 AP(500), X(30), Y(30), alpha
  INCX = 1
  alpha = 1.0D0
  N = 30
  CALL DSPR('U',N,alpha,X,INCX,AP)

  This FORTRAN code computes the rank-1 update A  =  x*transp(x)
   + A where A is a real symmetric matrix, of order 30, with its upper-
  triangular part stored in packed form in AP.