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The Datafile PD-CD 1 Issue 2
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PDCD-1 - Issue 02.iso
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_utilities
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utilities
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001
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meschach
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!Meschach
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c
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qrfactor
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1994-01-13
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/**************************************************************************
**
** Copyright (C) 1993 David E. Steward & Zbigniew Leyk, all rights reserved.
**
** Meschach Library
**
** This Meschach Library is provided "as is" without any express
** or implied warranty of any kind with respect to this software.
** In particular the authors shall not be liable for any direct,
** indirect, special, incidental or consequential damages arising
** in any way from use of the software.
**
** Everyone is granted permission to copy, modify and redistribute this
** Meschach Library, provided:
** 1. All copies contain this copyright notice.
** 2. All modified copies shall carry a notice stating who
** made the last modification and the date of such modification.
** 3. No charge is made for this software or works derived from it.
** This clause shall not be construed as constraining other software
** distributed on the same medium as this software, nor is a
** distribution fee considered a charge.
**
***************************************************************************/
/*
This file contains the routines needed to perform QR factorisation
of matrices, as well as Householder transformations.
The internal "factored form" of a matrix A is not quite standard.
The diagonal of A is replaced by the diagonal of R -- not by the 1st non-zero
entries of the Householder vectors. The 1st non-zero entries are held in
the diag parameter of QRfactor(). The reason for this non-standard
representation is that it enables direct use of the Usolve() function
rather than requiring that a seperate function be written just for this case.
See, e.g., QRsolve() below for more details.
*/
static char rcsid[] = "$Id: qrfactor.c,v 1.5 1994/01/13 05:35:07 des Exp $";
#include <stdio.h>
#include <math.h>
#include "matrix2.h"
#define sign(x) ((x) > 0.0 ? 1 : ((x) < 0.0 ? -1 : 0 ))
extern VEC *Usolve(); /* See matrix2.h */
/* Note: The usual representation of a Householder transformation is taken
to be:
P = I - beta.u.uT
where beta = 2/(uT.u) and u is called the Householder vector
*/
/* QRfactor -- forms the QR factorisation of A -- factorisation stored in
compact form as described above ( not quite standard format ) */
/* MAT *QRfactor(A,diag,beta) */
MAT *QRfactor(A,diag)
MAT *A;
VEC *diag /* ,*beta */;
{
u_int k,limit;
Real beta;
static VEC *tmp1=VNULL;
if ( ! A || ! diag )
error(E_NULL,"QRfactor");
limit = min(A->m,A->n);
if ( diag->dim < limit )
error(E_SIZES,"QRfactor");
tmp1 = v_resize(tmp1,A->m);
MEM_STAT_REG(tmp1,TYPE_VEC);
for ( k=0; k<limit; k++ )
{
/* get H/holder vector for the k-th column */
get_col(A,k,tmp1);
/* hhvec(tmp1,k,&beta->ve[k],tmp1,&A->me[k][k]); */
hhvec(tmp1,k,&beta,tmp1,&A->me[k][k]);
diag->ve[k] = tmp1->ve[k];
/* apply H/holder vector to remaining columns */
/* hhtrcols(A,k,k+1,tmp1,beta->ve[k]); */
hhtrcols(A,k,k+1,tmp1,beta);
}
return (A);
}
/* QRCPfactor -- forms the QR factorisation of A with column pivoting
-- factorisation stored in compact form as described above
( not quite standard format ) */
/* MAT *QRCPfactor(A,diag,beta,px) */
MAT *QRCPfactor(A,diag,px)
MAT *A;
VEC *diag /* , *beta */;
PERM *px;
{
u_int i, i_max, j, k, limit;
static VEC *gamma=VNULL, *tmp1=VNULL, *tmp2=VNULL;
Real beta, maxgamma, sum, tmp;
if ( ! A || ! diag || ! px )
error(E_NULL,"QRCPfactor");
limit = min(A->m,A->n);
if ( diag->dim < limit || px->size != A->n )
error(E_SIZES,"QRCPfactor");
tmp1 = v_resize(tmp1,A->m);
tmp2 = v_resize(tmp2,A->m);
gamma = v_resize(gamma,A->n);
MEM_STAT_REG(tmp1,TYPE_VEC);
MEM_STAT_REG(tmp2,TYPE_VEC);
MEM_STAT_REG(gamma,TYPE_VEC);
/* initialise gamma and px */
for ( j=0; j<A->n; j++ )
{
px->pe[j] = j;
sum = 0.0;
for ( i=0; i<A->m; i++ )
sum += square(A->me[i][j]);
gamma->ve[j] = sum;
}
for ( k=0; k<limit; k++ )
{
/* find "best" column to use */
i_max = k; maxgamma = gamma->ve[k];
for ( i=k+1; i<A->n; i++ )
/* Loop invariant:maxgamma=gamma[i_max]
>=gamma[l];l=k,...,i-1 */
if ( gamma->ve[i] > maxgamma )
{ maxgamma = gamma->ve[i]; i_max = i; }
/* swap columns if necessary */
if ( i_max != k )
{
/* swap gamma values */
tmp = gamma->ve[k];
gamma->ve[k] = gamma->ve[i_max];
gamma->ve[i_max] = tmp;
/* update column permutation */
px_transp(px,k,i_max);
/* swap columns of A */
for ( i=0; i<A->m; i++ )
{
tmp = A->me[i][k];
A->me[i][k] = A->me[i][i_max];
A->me[i][i_max] = tmp;
}
}
/* get H/holder vector for the k-th column */
get_col(A,k,tmp1);
/* hhvec(tmp1,k,&beta->ve[k],tmp1,&A->me[k][k]); */
hhvec(tmp1,k,&beta,tmp1,&A->me[k][k]);
diag->ve[k] = tmp1->ve[k];
/* apply H/holder vector to remaining columns */
/* hhtrcols(A,k,k+1,tmp1,beta->ve[k]); */
hhtrcols(A,k,k+1,tmp1,beta);
/* update gamma values */
for ( j=k+1; j<A->n; j++ )
gamma->ve[j] -= square(A->me[k][j]);
}
return (A);
}
/* Qsolve -- solves Qx = b, Q is an orthogonal matrix stored in compact
form a la QRfactor() -- may be in-situ */
/* VEC *_Qsolve(QR,diag,beta,b,x,tmp) */
VEC *_Qsolve(QR,diag,b,x,tmp)
MAT *QR;
VEC *diag /* ,*beta */ , *b, *x, *tmp;
{
u_int dynamic;
int k, limit;
Real beta, r_ii, tmp_val;
limit = min(QR->m,QR->n);
dynamic = FALSE;
if ( ! QR || ! diag || ! b )
error(E_NULL,"_Qsolve");
if ( diag->dim < limit || b->dim != QR->m )
error(E_SIZES,"_Qsolve");
x = v_resize(x,QR->m);
if ( tmp == VNULL )
dynamic = TRUE;
tmp = v_resize(tmp,QR->m);
/* apply H/holder transforms in normal order */
x = v_copy(b,x);
for ( k = 0 ; k < limit ; k++ )
{
get_col(QR,k,tmp);
r_ii = fabs(tmp->ve[k]);
tmp->ve[k] = diag->ve[k];
tmp_val = (r_ii*fabs(diag->ve[k]));
beta = ( tmp_val == 0.0 ) ? 0.0 : 1.0/tmp_val;
/* hhtrvec(tmp,beta->ve[k],k,x,x); */
hhtrvec(tmp,beta,k,x,x);
}
if ( dynamic )
V_FREE(tmp);
return (x);
}
/* makeQ -- constructs orthogonal matrix from Householder vectors stored in
compact QR form */
/* MAT *makeQ(QR,diag,beta,Qout) */
MAT *makeQ(QR,diag,Qout)
MAT *QR,*Qout;
VEC *diag /* , *beta */;
{
static VEC *tmp1=VNULL,*tmp2=VNULL;
u_int i, limit;
Real beta, r_ii, tmp_val;
int j;
limit = min(QR->m,QR->n);
if ( ! QR || ! diag )
error(E_NULL,"makeQ");
if ( diag->dim < limit )
error(E_SIZES,"makeQ");
if ( Qout==(MAT *)NULL || Qout->m < QR->m || Qout->n < QR->m )
Qout = m_get(QR->m,QR->m);
tmp1 = v_resize(tmp1,QR->m); /* contains basis vec & columns of Q */
tmp2 = v_resize(tmp2,QR->m); /* contains H/holder vectors */
MEM_STAT_REG(tmp1,TYPE_VEC);
MEM_STAT_REG(tmp2,TYPE_VEC);
for ( i=0; i<QR->m ; i++ )
{ /* get i-th column of Q */
/* set up tmp1 as i-th basis vector */
for ( j=0; j<QR->m ; j++ )
tmp1->ve[j] = 0.0;
tmp1->ve[i] = 1.0;
/* apply H/h transforms in reverse order */
for ( j=limit-1; j>=0; j-- )
{
get_col(QR,j,tmp2);
r_ii = fabs(tmp2->ve[j]);
tmp2->ve[j] = diag->ve[j];
tmp_val = (r_ii*fabs(diag->ve[j]));
beta = ( tmp_val == 0.0 ) ? 0.0 : 1.0/tmp_val;
/* hhtrvec(tmp2,beta->ve[j],j,tmp1,tmp1); */
hhtrvec(tmp2,beta,j,tmp1,tmp1);
}
/* insert into Q */
set_col(Qout,i,tmp1);
}
return (Qout);
}
/* makeR -- constructs upper triangular matrix from QR (compact form)
-- may be in-situ (all it does is zero the lower 1/2) */
MAT *makeR(QR,Rout)
MAT *QR,*Rout;
{
u_int i,j;
if ( QR==(MAT *)NULL )
error(E_NULL,"makeR");
Rout = m_copy(QR,Rout);
for ( i=1; i<QR->m; i++ )
for ( j=0; j<QR->n && j<i; j++ )
Rout->me[i][j] = 0.0;
return (Rout);
}
/* QRsolve -- solves the system Q.R.x=b where Q & R are stored in compact form
-- returns x, which is created if necessary */
/* VEC *QRsolve(QR,diag,beta,b,x) */
VEC *QRsolve(QR,diag,b,x)
MAT *QR;
VEC *diag /* , *beta */ , *b, *x;
{
int limit;
static VEC *tmp = VNULL;
if ( ! QR || ! diag || ! b )
error(E_NULL,"QRsolve");
limit = min(QR->m,QR->n);
if ( diag->dim < limit || b->dim != QR->m )
error(E_SIZES,"QRsolve");
tmp = v_resize(tmp,limit);
MEM_STAT_REG(tmp,TYPE_VEC);
x = v_resize(x,QR->n);
_Qsolve(QR,diag,b,x,tmp);
x = Usolve(QR,x,x,0.0);
v_resize(x,QR->n);
return x;
}
/* QRCPsolve -- solves A.x = b where A is factored by QRCPfactor()
-- assumes that A is in the compact factored form */
/* VEC *QRCPsolve(QR,diag,beta,pivot,b,x) */
VEC *QRCPsolve(QR,diag,pivot,b,x)
MAT *QR;
VEC *diag /* , *beta */;
PERM *pivot;
VEC *b, *x;
{
static VEC *tmp=VNULL;
if ( ! QR || ! diag || ! pivot || ! b )
error(E_NULL,"QRCPsolve");
if ( (QR->m > diag->dim &&QR->n > diag->dim) || QR->n != pivot->size )
error(E_SIZES,"QRCPsolve");
tmp = QRsolve(QR,diag /* , beta */ ,b,tmp);
MEM_STAT_REG(tmp,TYPE_VEC);
x = pxinv_vec(pivot,tmp,x);
return x;
}
/* Umlt -- compute out = upper_triang(U).x
-- may be in situ */
static VEC *Umlt(U,x,out)
MAT *U;
VEC *x, *out;
{
int i, limit;
if ( U == MNULL || x == VNULL )
error(E_NULL,"Umlt");
limit = min(U->m,U->n);
if ( limit != x->dim )
error(E_SIZES,"Umlt");
if ( out == VNULL || out->dim < limit )
out = v_resize(out,limit);
for ( i = 0; i < limit; i++ )
out->ve[i] = __ip__(&(x->ve[i]),&(U->me[i][i]),limit - i);
return out;
}
/* UTmlt -- returns out = upper_triang(U)^T.x */
static VEC *UTmlt(U,x,out)
MAT *U;
VEC *x, *out;
{
Real sum;
int i, j, limit;
if ( U == MNULL || x == VNULL )
error(E_NULL,"UTmlt");
limit = min(U->m,U->n);
if ( out == VNULL || out->dim < limit )
out = v_resize(out,limit);
for ( i = limit-1; i >= 0; i-- )
{
sum = 0.0;
for ( j = 0; j <= i; j++ )
sum += U->me[j][i]*x->ve[j];
out->ve[i] = sum;
}
return out;
}
/* QRTsolve -- solve A^T.sc = c where the QR factors of A are stored in
compact form
-- returns sc
-- original due to Mike Osborne modified Wed 09th Dec 1992 */
VEC *QRTsolve(A,diag,c,sc)
MAT *A;
VEC *diag, *c, *sc;
{
int i, j, k, n, p;
Real beta, r_ii, s, tmp_val;
if ( ! A || ! diag || ! c )
error(E_NULL,"QRTsolve");
if ( diag->dim < min(A->m,A->n) )
error(E_SIZES,"QRTsolve");
sc = v_resize(sc,A->m);
n = sc->dim;
p = c->dim;
if ( n == p )
k = p-2;
else
k = p-1;
v_zero(sc);
sc->ve[0] = c->ve[0]/A->me[0][0];
if ( n == 1)
return sc;
if ( p > 1)
{
for ( i = 1; i < p; i++ )
{
s = 0.0;
for ( j = 0; j < i; j++ )
s += A->me[j][i]*sc->ve[j];
if ( A->me[i][i] == 0.0 )
error(E_SING,"QRTsolve");
sc->ve[i]=(c->ve[i]-s)/A->me[i][i];
}
}
for (i = k; i >= 0; i--)
{
s = diag->ve[i]*sc->ve[i];
for ( j = i+1; j < n; j++ )
s += A->me[j][i]*sc->ve[j];
r_ii = fabs(A->me[i][i]);
tmp_val = (r_ii*fabs(diag->ve[i]));
beta = ( tmp_val == 0.0 ) ? 0.0 : 1.0/tmp_val;
tmp_val = beta*s;
sc->ve[i] -= tmp_val*diag->ve[i];
for ( j = i+1; j < n; j++ )
sc->ve[j] -= tmp_val*A->me[j][i];
}
return sc;
}
/* QRcondest -- returns an estimate of the 2-norm condition number of the
matrix factorised by QRfactor() or QRCPfactor()
-- note that as Q does not affect the 2-norm condition number,
it is not necessary to pass the diag, beta (or pivot) vectors
-- generates a lower bound on the true condition number
-- if the matrix is exactly singular, HUGE is returned
-- note that QRcondest() is likely to be more reliable for
matrices factored using QRCPfactor() */
double QRcondest(QR)
MAT *QR;
{
static VEC *y=VNULL;
Real norm1, norm2, sum, tmp1, tmp2;
int i, j, limit;
if ( QR == MNULL )
error(E_NULL,"QRcondest");
limit = min(QR->m,QR->n);
for ( i = 0; i < limit; i++ )
if ( QR->me[i][i] == 0.0 )
return HUGE;
y = v_resize(y,limit);
MEM_STAT_REG(y,TYPE_VEC);
/* use the trick for getting a unit vector y with ||R.y||_inf small
from the LU condition estimator */
for ( i = 0; i < limit; i++ )
{
sum = 0.0;
for ( j = 0; j < i; j++ )
sum -= QR->me[j][i]*y->ve[j];
sum -= (sum < 0.0) ? 1.0 : -1.0;
y->ve[i] = sum / QR->me[i][i];
}
UTmlt(QR,y,y);
/* now apply inverse power method to R^T.R */
for ( i = 0; i < 3; i++ )
{
tmp1 = v_norm2(y);
sv_mlt(1/tmp1,y,y);
UTsolve(QR,y,y,0.0);
tmp2 = v_norm2(y);
sv_mlt(1/v_norm2(y),y,y);
Usolve(QR,y,y,0.0);
}
/* now compute approximation for ||R^{-1}||_2 */
norm1 = sqrt(tmp1)*sqrt(tmp2);
/* now use complementary approach to compute approximation to ||R||_2 */
for ( i = limit-1; i >= 0; i-- )
{
sum = 0.0;
for ( j = i+1; j < limit; j++ )
sum += QR->me[i][j]*y->ve[j];
y->ve[i] = (sum >= 0.0) ? 1.0 : -1.0;
y->ve[i] = (QR->me[i][i] >= 0.0) ? y->ve[i] : - y->ve[i];
}
/* now apply power method to R^T.R */
for ( i = 0; i < 3; i++ )
{
tmp1 = v_norm2(y);
sv_mlt(1/tmp1,y,y);
Umlt(QR,y,y);
tmp2 = v_norm2(y);
sv_mlt(1/tmp2,y,y);
UTmlt(QR,y,y);
}
norm2 = sqrt(tmp1)*sqrt(tmp2);
/* printf("QRcondest: norm1 = %g, norm2 = %g\n",norm1,norm2); */
return norm1*norm2;
}