Developer Reference for Intel® oneAPI Math Kernel Library for Fortran

ID 766686
Date 6/24/2024
Public

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p?gebrd

Reduces a general matrix to bidiagonal form.

Syntax

call psgebrd(m, n, a, ia, ja, desca, d, e, tauq, taup, work, lwork, info)

call pdgebrd(m, n, a, ia, ja, desca, d, e, tauq, taup, work, lwork, info)

call pcgebrd(m, n, a, ia, ja, desca, d, e, tauq, taup, work, lwork, info)

call pzgebrd(m, n, a, ia, ja, desca, d, e, tauq, taup, work, lwork, info)

Include Files

Description

The p?gebrd routine reduces a real/complex general m-by-n distributed matrix sub(A)= A(ia:ia+m-1, ja:ja+n-1) to upper or lower bidiagonal form B by an orthogonal/unitary transformation:

Q'*sub(A)*P = B.

If mn, B is upper bidiagonal; if m < n, B is lower bidiagonal.

Input Parameters

m

(global) INTEGER. The number of rows in the distributed matrix sub(A) (m≥0).

n

(global) INTEGER. The number of columns in the distributed matrix sub(A) (n≥0).

a

(local)

REAL for psgebrd

DOUBLE PRECISION for pdgebrd

COMPLEX for pcgebrd

DOUBLE COMPLEX for pzgebrd.

Real pointer into the local memory to an array of size (lld_a,LOCc(ja+n-1)). On entry, this array contains the distributed matrix sub (A).

ia, ja

(global) INTEGER. The row and column indices in the global matrix A indicating the first row and the first column of the submatrix A, respectively.

desca

(global and local) INTEGER array of size dlen_. The array descriptor for the distributed matrix A.

work

(local)

REAL for psgebrd

DOUBLE PRECISION for pdgebrd

COMPLEX for pcgebrd

DOUBLE COMPLEX for pzgebrd.

Workspace array of size lwork.

lwork

(local or global) INTEGER, size of work, must be at least:

lworknb*(mpa0 + nqa0+1)+ nqa0

where nb = mb_a = nb_a,

iroffa = mod(ia-1, nb),

icoffa = mod(ja-1, nb),

iarow = indxg2p(ia, nb, MYROW, rsrc_a, NPROW),

iacol = indxg2p (ja, nb, MYCOL, csrc_a, NPCOL),

mpa0 = numroc(m +iroffa, nb, MYROW, iarow, NPROW),

nqa0 = numroc(n +icoffa, nb, MYCOL, iacol, NPCOL),

NOTE:

mod(x,y) is the integer remainder of x/y.

indxg2p and numroc are ScaLAPACK tool functions; MYROW, MYCOL, NPROW and NPCOL can be determined by calling the subroutine blacs_gridinfo.

If lwork = -1, then lwork is global input and a workspace query is assumed; the routine only calculates the minimum and optimal size for all work arrays. Each of these values is returned in the first entry of the corresponding work array, and no error message is issued by pxerbla.

Output Parameters

a

On exit, if mn, the diagonal and the first superdiagonal of sub(A) are overwritten with the upper bidiagonal matrix B; the elements below the diagonal, with the array tauq, represent the orthogonal/unitary matrix Q as a product of elementary reflectors, and the elements above the first superdiagonal, with the array taup, represent the orthogonal matrix P as a product of elementary reflectors. If m < n, the diagonal and the first subdiagonal are overwritten with the lower bidiagonal matrix B; the elements below the first subdiagonal, with the array tauq, represent the orthogonal/unitary matrix Q as a product of elementary reflectors, and the elements above the diagonal, with the array taup, represent the orthogonal matrix P as a product of elementary reflectors. See Application Notes below.

d

(local)

REAL for single-precision flavors

DOUBLE PRECISION for double-precision flavors.

Array of size LOCc(ja+min(m,n)-1) if mn and LOCr(ia+min(m,n)-1) otherwise. The distributed diagonal elements of the bidiagonal matrix B: d(i) = a(i,i).

d is tied to the distributed matrix A.

e

(local)

REAL for single-precision flavors

DOUBLE PRECISION for double-precision flavors.

Array of size LOCr(ia+min(m,n)-1) if mn; LOCc(ja+min(m,n)-2) otherwise. The distributed off-diagonal elements of the bidiagonal distributed matrix B:

If mn, e(i) = a(i,i+1) for i = 1,2,..., n-1; if m < n, e(i) = a(i+1,i) for i = 1,2,..., m-1. e is tied to the distributed matrix A.

tauq, taup

(local)

REAL for psgebrd

DOUBLE PRECISION for pdgebrd

COMPLEX for pcgebrd

DOUBLE COMPLEX for pzgebrd.

Arrays of size LOCc(ja+min(m,n)-1) for tauq and LOCr(ia+min(m,n)-1) for taup. Contain the scalar factors of the elementary reflectors that represent the orthogonal/unitary matrices Q and P, respectively. tauq and taup are tied to the distributed matrix A. See Application Notes below.

work(1)

On exit work(1) contains the minimum value of lwork required for optimum performance.

info

(global) INTEGER.

= 0: the execution is successful.

< 0: if the i-th argument is an array and the j-th entry had an illegal value, then info = -(i*100+j); if the i-th argument is a scalar and had an illegal value, then info = -i.

Application Notes

The matrices Q and P are represented as products of elementary reflectors:

If mn,

Q = H(1)*H(2)*...*H(n), and P = G(1)*G(2)*...*G(n-1).

Each H(i) and G(i) has the form:

H(i)= i - tauq * v * v' and G(i) = i - taup*u*u'

where tauq and taup are real/complex scalars, and v and u are real/complex vectors;

v(1:i-1) = 0, v(i) = 1, and v(i+1:m) is stored on exit in A(ia+i:ia+m-1,ja+i-1);

u(1:i) = 0, u(i+1) = 1, and u(i+2:n) is stored on exit in A (ia+i-1,ja+i+1:ja+n-1);

tauq is stored in tauq(ja+i-1) and taup in taup(ia+i-1).

If m < n,

Q = H(1)*H(2)*...*H(m-1), and P = G(1)* G(2)*...* G(m)

Each H (i) and G(i) has the form:

H(i)= i-tauq*v*v' and G(i)= i-taup*u*u'

here tauq and taup are real/complex scalars, and v and u are real/complex vectors;

v(1:i) = 0, v(i+1) = 1, and v(i+2:m) is stored on exit in A (ia+i:ia+m-1,ja+i-1); u(1:i-1) = 0, u(i) = 1, and u(i+1:n) is stored on exit in A(ia+i-1,ja+i+1:ja+n-1);

tauq is stored in tauq(ja+i-1) and taup in taup(ia+i-1).

The contents of sub(A) on exit are illustrated by the following examples:

m = 6 and n = 5(m > n):


Equation

m = 5 and n = 6(m < n):


Equation

where d and e denote diagonal and off-diagonal elements of B, vi denotes an element of the vector defining H(i), and ui an element of the vector defining G(i).

See Also