Previous: zgelq2 Up: ../lapack-z.html Next: zgels


zgelqf


 NAME
      ZGELQF - compute an LQ factorization of a complex M-by-N
      matrix A

 SYNOPSIS
      SUBROUTINE ZGELQF( M, N, A, LDA, TAU, WORK, LWORK, INFO )

          INTEGER        INFO, LDA, LWORK, M, N

          COMPLEX*16     A( LDA, * ), TAU( * ), WORK( LWORK )

 PURPOSE
      ZGELQF computes an LQ factorization of a complex M-by-N
      matrix A: A = L * Q.

 ARGUMENTS
      M       (input) INTEGER
              The number of rows of the matrix A.  M >= 0.

      N       (input) INTEGER
              The number of columns of the matrix A.  N >= 0.

      A       (input/output) COMPLEX*16 array, dimension (LDA,N)
              On entry, the M-by-N matrix A.  On exit, the ele-
              ments on and below the diagonal of the array contain
              the m-by-min(m,n) lower trapezoidal matrix L (L is
              lower triangular if m <= n); the elements above the
              diagonal, with the array TAU, represent the unitary
              matrix Q as a product of elementary reflectors (see
              Further Details).  LDA     (input) INTEGER The lead-
              ing dimension of the array A.  LDA >= max(1,M).

      TAU     (output) COMPLEX*16 array, dimension (min(M,N))
              The scalar factors of the elementary reflectors (see
              Further Details).

      WORK    (workspace) COMPLEX*16 array, dimension (LWORK)
              On exit, if INFO = 0, WORK(1) returns the optimal
              LWORK.

      LWORK   (input) INTEGER
              The dimension of the array WORK.  LWORK >= max(1,M).
              For optimum performance LWORK >= M*NB, where NB is
              the optimal blocksize.

      INFO    (output) INTEGER
              = 0:  successful exit
              < 0:  if INFO = -i, the i-th argument had an illegal
              value

 FURTHER DETAILS
      The matrix Q is represented as a product of elementary
      reflectors

         Q = H(k)' . . . H(2)' H(1)', where k = min(m,n).

      Each H(i) has the form

         H(i) = I - tau * v * v'

      where tau is a complex scalar, and v is a complex vector
      with v(1:i-1) = 0 and v(i) = 1; conjg(v(i+1:n)) is stored on
      exit in A(i,i+1:n), and tau in TAU(i).