cgeql2.f.html
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SUBROUTINE <a name="CGEQL2.1"></a><a href="cgeql2.f.html#CGEQL2.1">CGEQL2</a>( M, N, A, LDA, TAU, WORK, INFO )
<span class="comment">*</span><span class="comment">
</span><span class="comment">*</span><span class="comment"> -- LAPACK routine (version 3.1) --
</span><span class="comment">*</span><span class="comment"> Univ. of Tennessee, Univ. of California Berkeley and NAG Ltd..
</span><span class="comment">*</span><span class="comment"> November 2006
</span><span class="comment">*</span><span class="comment">
</span><span class="comment">*</span><span class="comment"> .. Scalar Arguments ..
</span> INTEGER INFO, LDA, M, N
<span class="comment">*</span><span class="comment"> ..
</span><span class="comment">*</span><span class="comment"> .. Array Arguments ..
</span> COMPLEX A( LDA, * ), TAU( * ), WORK( * )
<span class="comment">*</span><span class="comment"> ..
</span><span class="comment">*</span><span class="comment">
</span><span class="comment">*</span><span class="comment"> Purpose
</span><span class="comment">*</span><span class="comment"> =======
</span><span class="comment">*</span><span class="comment">
</span><span class="comment">*</span><span class="comment"> <a name="CGEQL2.17"></a><a href="cgeql2.f.html#CGEQL2.1">CGEQL2</a> computes a QL factorization of a complex m by n matrix A:
</span><span class="comment">*</span><span class="comment"> A = Q * L.
</span><span class="comment">*</span><span class="comment">
</span><span class="comment">*</span><span class="comment"> Arguments
</span><span class="comment">*</span><span class="comment"> =========
</span><span class="comment">*</span><span class="comment">
</span><span class="comment">*</span><span class="comment"> M (input) INTEGER
</span><span class="comment">*</span><span class="comment"> The number of rows of the matrix A. M >= 0.
</span><span class="comment">*</span><span class="comment">
</span><span class="comment">*</span><span class="comment"> N (input) INTEGER
</span><span class="comment">*</span><span class="comment"> The number of columns of the matrix A. N >= 0.
</span><span class="comment">*</span><span class="comment">
</span><span class="comment">*</span><span class="comment"> A (input/output) COMPLEX array, dimension (LDA,N)
</span><span class="comment">*</span><span class="comment"> On entry, the m by n matrix A.
</span><span class="comment">*</span><span class="comment"> On exit, if m >= n, the lower triangle of the subarray
</span><span class="comment">*</span><span class="comment"> A(m-n+1:m,1:n) contains the n by n lower triangular matrix L;
</span><span class="comment">*</span><span class="comment"> if m <= n, the elements on and below the (n-m)-th
</span><span class="comment">*</span><span class="comment"> superdiagonal contain the m by n lower trapezoidal matrix L;
</span><span class="comment">*</span><span class="comment"> the remaining elements, with the array TAU, represent the
</span><span class="comment">*</span><span class="comment"> unitary matrix Q as a product of elementary reflectors
</span><span class="comment">*</span><span class="comment"> (see Further Details).
</span><span class="comment">*</span><span class="comment">
</span><span class="comment">*</span><span class="comment"> LDA (input) INTEGER
</span><span class="comment">*</span><span class="comment"> The leading dimension of the array A. LDA >= max(1,M).
</span><span class="comment">*</span><span class="comment">
</span><span class="comment">*</span><span class="comment"> TAU (output) COMPLEX array, dimension (min(M,N))
</span><span class="comment">*</span><span class="comment"> The scalar factors of the elementary reflectors (see Further
</span><span class="comment">*</span><span class="comment"> Details).
</span><span class="comment">*</span><span class="comment">
</span><span class="comment">*</span><span class="comment"> WORK (workspace) COMPLEX array, dimension (N)
</span><span class="comment">*</span><span class="comment">
</span><span class="comment">*</span><span class="comment"> INFO (output) INTEGER
</span><span class="comment">*</span><span class="comment"> = 0: successful exit
</span><span class="comment">*</span><span class="comment"> < 0: if INFO = -i, the i-th argument had an illegal value
</span><span class="comment">*</span><span class="comment">
</span><span class="comment">*</span><span class="comment"> Further Details
</span><span class="comment">*</span><span class="comment"> ===============
</span><span class="comment">*</span><span class="comment">
</span><span class="comment">*</span><span class="comment"> The matrix Q is represented as a product of elementary reflectors
</span><span class="comment">*</span><span class="comment">
</span><span class="comment">*</span><span class="comment"> Q = H(k) . . . H(2) H(1), where k = min(m,n).
</span><span class="comment">*</span><span class="comment">
</span><span class="comment">*</span><span class="comment"> Each H(i) has the form
</span><span class="comment">*</span><span class="comment">
</span><span class="comment">*</span><span class="comment"> H(i) = I - tau * v * v'
</span><span class="comment">*</span><span class="comment">
</span><span class="comment">*</span><span class="comment"> where tau is a complex scalar, and v is a complex vector with
</span><span class="comment">*</span><span class="comment"> v(m-k+i+1:m) = 0 and v(m-k+i) = 1; v(1:m-k+i-1) is stored on exit in
</span><span class="comment">*</span><span class="comment"> A(1:m-k+i-1,n-k+i), and tau in TAU(i).
</span><span class="comment">*</span><span class="comment">
</span><span class="comment">*</span><span class="comment"> =====================================================================
</span><span class="comment">*</span><span class="comment">
</span><span class="comment">*</span><span class="comment"> .. Parameters ..
</span> COMPLEX ONE
PARAMETER ( ONE = ( 1.0E+0, 0.0E+0 ) )
<span class="comment">*</span><span class="comment"> ..
</span><span class="comment">*</span><span class="comment"> .. Local Scalars ..
</span> INTEGER I, K
COMPLEX ALPHA
<span class="comment">*</span><span class="comment"> ..
</span><span class="comment">*</span><span class="comment"> .. External Subroutines ..
</span> EXTERNAL <a name="CLARF.78"></a><a href="clarf.f.html#CLARF.1">CLARF</a>, <a name="CLARFG.78"></a><a href="clarfg.f.html#CLARFG.1">CLARFG</a>, <a name="XERBLA.78"></a><a href="xerbla.f.html#XERBLA.1">XERBLA</a>
<span class="comment">*</span><span class="comment"> ..
</span><span class="comment">*</span><span class="comment"> .. Intrinsic Functions ..
</span> INTRINSIC CONJG, MAX, MIN
<span class="comment">*</span><span class="comment"> ..
</span><span class="comment">*</span><span class="comment"> .. Executable Statements ..
</span><span class="comment">*</span><span class="comment">
</span><span class="comment">*</span><span class="comment"> Test the input arguments
</span><span class="comment">*</span><span class="comment">
</span> INFO = 0
IF( M.LT.0 ) THEN
INFO = -1
ELSE IF( N.LT.0 ) THEN
INFO = -2
ELSE IF( LDA.LT.MAX( 1, M ) ) THEN
INFO = -4
END IF
IF( INFO.NE.0 ) THEN
CALL <a name="XERBLA.96"></a><a href="xerbla.f.html#XERBLA.1">XERBLA</a>( <span class="string">'<a name="CGEQL2.96"></a><a href="cgeql2.f.html#CGEQL2.1">CGEQL2</a>'</span>, -INFO )
RETURN
END IF
<span class="comment">*</span><span class="comment">
</span> K = MIN( M, N )
<span class="comment">*</span><span class="comment">
</span> DO 10 I = K, 1, -1
<span class="comment">*</span><span class="comment">
</span><span class="comment">*</span><span class="comment"> Generate elementary reflector H(i) to annihilate
</span><span class="comment">*</span><span class="comment"> A(1:m-k+i-1,n-k+i)
</span><span class="comment">*</span><span class="comment">
</span> ALPHA = A( M-K+I, N-K+I )
CALL <a name="CLARFG.108"></a><a href="clarfg.f.html#CLARFG.1">CLARFG</a>( M-K+I, ALPHA, A( 1, N-K+I ), 1, TAU( I ) )
<span class="comment">*</span><span class="comment">
</span><span class="comment">*</span><span class="comment"> Apply H(i)' to A(1:m-k+i,1:n-k+i-1) from the left
</span><span class="comment">*</span><span class="comment">
</span> A( M-K+I, N-K+I ) = ONE
CALL <a name="CLARF.113"></a><a href="clarf.f.html#CLARF.1">CLARF</a>( <span class="string">'Left'</span>, M-K+I, N-K+I-1, A( 1, N-K+I ), 1,
$ CONJG( TAU( I ) ), A, LDA, WORK )
A( M-K+I, N-K+I ) = ALPHA
10 CONTINUE
RETURN
<span class="comment">*</span><span class="comment">
</span><span class="comment">*</span><span class="comment"> End of <a name="CGEQL2.119"></a><a href="cgeql2.f.html#CGEQL2.1">CGEQL2</a>
</span><span class="comment">*</span><span class="comment">
</span> END
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