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1592 lines
39 KiB
C++
1592 lines
39 KiB
C++
/**
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* Marlin 3D Printer Firmware
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* Copyright (C) 2016 MarlinFirmware [https://github.com/MarlinFirmware/Marlin]
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*
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* Based on Sprinter and grbl.
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* Copyright (C) 2011 Camiel Gubbels / Erik van der Zalm
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*
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* This program is free software: you can redistribute it and/or modify
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* it under the terms of the GNU General Public License as published by
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* the Free Software Foundation, either version 3 of the License, or
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* (at your option) any later version.
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*
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* This program is distributed in the hope that it will be useful,
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* but WITHOUT ANY WARRANTY; without even the implied warranty of
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* MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the
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* GNU General Public License for more details.
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*
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* You should have received a copy of the GNU General Public License
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* along with this program. If not, see <http://www.gnu.org/licenses/>.
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*
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*/
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#include "qr_solve.h"
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#if ENABLED(AUTO_BED_LEVELING_LINEAR)
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#include <stdlib.h>
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#include <math.h>
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//# include "r8lib.h"
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int i4_min(int i1, int i2)
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/******************************************************************************/
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/**
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Purpose:
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I4_MIN returns the smaller of two I4's.
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Licensing:
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This code is distributed under the GNU LGPL license.
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Modified:
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29 August 2006
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Author:
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John Burkardt
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Parameters:
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Input, int I1, I2, two integers to be compared.
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Output, int I4_MIN, the smaller of I1 and I2.
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*/
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{
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return (i1 < i2) ? i1 : i2;
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}
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float r8_epsilon(void)
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/******************************************************************************/
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/**
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Purpose:
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R8_EPSILON returns the R8 round off unit.
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Discussion:
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R8_EPSILON is a number R which is a power of 2 with the property that,
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to the precision of the computer's arithmetic,
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1 < 1 + R
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but
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1 = ( 1 + R / 2 )
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Licensing:
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This code is distributed under the GNU LGPL license.
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Modified:
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01 September 2012
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Author:
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John Burkardt
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Parameters:
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Output, float R8_EPSILON, the R8 round-off unit.
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*/
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{
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const float value = 2.220446049250313E-016;
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return value;
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}
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float r8_max(float x, float y)
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/******************************************************************************/
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/**
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Purpose:
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R8_MAX returns the maximum of two R8's.
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Licensing:
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This code is distributed under the GNU LGPL license.
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Modified:
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07 May 2006
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Author:
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John Burkardt
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Parameters:
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Input, float X, Y, the quantities to compare.
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Output, float R8_MAX, the maximum of X and Y.
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*/
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{
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return (y < x) ? x : y;
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}
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float r8_abs(float x)
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/******************************************************************************/
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/**
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Purpose:
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R8_ABS returns the absolute value of an R8.
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Licensing:
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This code is distributed under the GNU LGPL license.
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Modified:
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07 May 2006
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Author:
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John Burkardt
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Parameters:
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Input, float X, the quantity whose absolute value is desired.
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Output, float R8_ABS, the absolute value of X.
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*/
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{
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return (x < 0.0) ? -x : x;
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}
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float r8_sign(float x)
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/******************************************************************************/
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/**
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Purpose:
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R8_SIGN returns the sign of an R8.
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Licensing:
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This code is distributed under the GNU LGPL license.
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Modified:
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08 May 2006
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Author:
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John Burkardt
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Parameters:
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Input, float X, the number whose sign is desired.
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Output, float R8_SIGN, the sign of X.
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*/
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{
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return (x < 0.0) ? -1.0 : 1.0;
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}
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float r8mat_amax(int m, int n, float a[])
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/******************************************************************************/
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/**
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Purpose:
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R8MAT_AMAX returns the maximum absolute value entry of an R8MAT.
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Discussion:
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An R8MAT is a doubly dimensioned array of R8 values, stored as a vector
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in column-major order.
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Licensing:
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This code is distributed under the GNU LGPL license.
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Modified:
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07 September 2012
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Author:
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John Burkardt
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Parameters:
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Input, int M, the number of rows in A.
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Input, int N, the number of columns in A.
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Input, float A[M*N], the M by N matrix.
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Output, float R8MAT_AMAX, the maximum absolute value entry of A.
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*/
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{
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float value = r8_abs(a[0 + 0 * m]);
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for (int j = 0; j < n; j++) {
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for (int i = 0; i < m; i++) {
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NOLESS(value, r8_abs(a[i + j * m]));
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}
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}
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return value;
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}
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void r8mat_copy(float a2[], int m, int n, float a1[])
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/******************************************************************************/
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/**
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Purpose:
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R8MAT_COPY_NEW copies one R8MAT to a "new" R8MAT.
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Discussion:
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An R8MAT is a doubly dimensioned array of R8 values, stored as a vector
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in column-major order.
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Licensing:
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This code is distributed under the GNU LGPL license.
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Modified:
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26 July 2008
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Author:
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John Burkardt
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Parameters:
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Input, int M, N, the number of rows and columns.
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Input, float A1[M*N], the matrix to be copied.
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Output, float R8MAT_COPY_NEW[M*N], the copy of A1.
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*/
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{
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for (int j = 0; j < n; j++) {
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for (int i = 0; i < m; i++)
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a2[i + j * m] = a1[i + j * m];
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}
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}
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/******************************************************************************/
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void daxpy(int n, float da, float dx[], int incx, float dy[], int incy)
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/******************************************************************************/
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/**
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Purpose:
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DAXPY computes constant times a vector plus a vector.
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Discussion:
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This routine uses unrolled loops for increments equal to one.
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Licensing:
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This code is distributed under the GNU LGPL license.
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Modified:
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30 March 2007
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Author:
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C version by John Burkardt
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Reference:
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Jack Dongarra, Cleve Moler, Jim Bunch, Pete Stewart,
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LINPACK User's Guide,
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SIAM, 1979.
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Charles Lawson, Richard Hanson, David Kincaid, Fred Krogh,
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Basic Linear Algebra Subprograms for Fortran Usage,
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Algorithm 539,
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ACM Transactions on Mathematical Software,
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Volume 5, Number 3, September 1979, pages 308-323.
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Parameters:
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Input, int N, the number of elements in DX and DY.
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Input, float DA, the multiplier of DX.
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Input, float DX[*], the first vector.
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Input, int INCX, the increment between successive entries of DX.
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Input/output, float DY[*], the second vector.
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On output, DY[*] has been replaced by DY[*] + DA * DX[*].
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Input, int INCY, the increment between successive entries of DY.
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*/
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{
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if (n <= 0 || da == 0.0) return;
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int i, ix, iy, m;
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/**
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Code for unequal increments or equal increments
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not equal to 1.
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*/
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if (incx != 1 || incy != 1) {
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if (0 <= incx)
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ix = 0;
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else
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ix = (- n + 1) * incx;
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if (0 <= incy)
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iy = 0;
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else
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iy = (- n + 1) * incy;
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for (i = 0; i < n; i++) {
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dy[iy] = dy[iy] + da * dx[ix];
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ix = ix + incx;
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iy = iy + incy;
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}
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}
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/**
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Code for both increments equal to 1.
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*/
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else {
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m = n % 4;
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for (i = 0; i < m; i++)
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dy[i] = dy[i] + da * dx[i];
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for (i = m; i < n; i = i + 4) {
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dy[i ] = dy[i ] + da * dx[i ];
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dy[i + 1] = dy[i + 1] + da * dx[i + 1];
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dy[i + 2] = dy[i + 2] + da * dx[i + 2];
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dy[i + 3] = dy[i + 3] + da * dx[i + 3];
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}
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}
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}
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/******************************************************************************/
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float ddot(int n, float dx[], int incx, float dy[], int incy)
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/******************************************************************************/
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/**
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Purpose:
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DDOT forms the dot product of two vectors.
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Discussion:
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This routine uses unrolled loops for increments equal to one.
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Licensing:
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This code is distributed under the GNU LGPL license.
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Modified:
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30 March 2007
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Author:
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C version by John Burkardt
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Reference:
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Jack Dongarra, Cleve Moler, Jim Bunch, Pete Stewart,
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LINPACK User's Guide,
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SIAM, 1979.
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Charles Lawson, Richard Hanson, David Kincaid, Fred Krogh,
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Basic Linear Algebra Subprograms for Fortran Usage,
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Algorithm 539,
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ACM Transactions on Mathematical Software,
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Volume 5, Number 3, September 1979, pages 308-323.
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Parameters:
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Input, int N, the number of entries in the vectors.
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Input, float DX[*], the first vector.
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Input, int INCX, the increment between successive entries in DX.
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Input, float DY[*], the second vector.
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Input, int INCY, the increment between successive entries in DY.
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Output, float DDOT, the sum of the product of the corresponding
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entries of DX and DY.
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*/
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{
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if (n <= 0) return 0.0;
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int i, m;
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float dtemp = 0.0;
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/**
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Code for unequal increments or equal increments
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not equal to 1.
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*/
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if (incx != 1 || incy != 1) {
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int ix = (incx >= 0) ? 0 : (-n + 1) * incx,
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iy = (incy >= 0) ? 0 : (-n + 1) * incy;
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for (i = 0; i < n; i++) {
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dtemp += dx[ix] * dy[iy];
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ix = ix + incx;
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iy = iy + incy;
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}
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}
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/**
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Code for both increments equal to 1.
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*/
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else {
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m = n % 5;
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for (i = 0; i < m; i++)
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dtemp += dx[i] * dy[i];
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for (i = m; i < n; i = i + 5) {
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dtemp += dx[i] * dy[i]
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+ dx[i + 1] * dy[i + 1]
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+ dx[i + 2] * dy[i + 2]
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+ dx[i + 3] * dy[i + 3]
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+ dx[i + 4] * dy[i + 4];
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}
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}
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return dtemp;
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}
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/******************************************************************************/
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float dnrm2(int n, float x[], int incx)
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/******************************************************************************/
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/**
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Purpose:
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DNRM2 returns the euclidean norm of a vector.
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Discussion:
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DNRM2 ( X ) = sqrt ( X' * X )
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Licensing:
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This code is distributed under the GNU LGPL license.
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Modified:
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30 March 2007
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Author:
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C version by John Burkardt
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Reference:
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Jack Dongarra, Cleve Moler, Jim Bunch, Pete Stewart,
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LINPACK User's Guide,
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SIAM, 1979.
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Charles Lawson, Richard Hanson, David Kincaid, Fred Krogh,
|
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Basic Linear Algebra Subprograms for Fortran Usage,
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Algorithm 539,
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ACM Transactions on Mathematical Software,
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Volume 5, Number 3, September 1979, pages 308-323.
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Parameters:
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Input, int N, the number of entries in the vector.
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Input, float X[*], the vector whose norm is to be computed.
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Input, int INCX, the increment between successive entries of X.
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Output, float DNRM2, the Euclidean norm of X.
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*/
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{
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float norm;
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if (n < 1 || incx < 1)
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norm = 0.0;
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else if (n == 1)
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norm = r8_abs(x[0]);
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else {
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float scale = 0.0, ssq = 1.0;
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int ix = 0;
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for (int i = 0; i < n; i++) {
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if (x[ix] != 0.0) {
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float absxi = r8_abs(x[ix]);
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if (scale < absxi) {
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ssq = 1.0 + ssq * (scale / absxi) * (scale / absxi);
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scale = absxi;
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}
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else
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ssq = ssq + (absxi / scale) * (absxi / scale);
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}
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ix += incx;
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}
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norm = scale * sqrt(ssq);
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}
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return norm;
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}
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/******************************************************************************/
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void dqrank(float a[], int lda, int m, int n, float tol, int* kr,
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int jpvt[], float qraux[])
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/******************************************************************************/
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/**
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Purpose:
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DQRANK computes the QR factorization of a rectangular matrix.
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Discussion:
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This routine is used in conjunction with DQRLSS to solve
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overdetermined, underdetermined and singular linear systems
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in a least squares sense.
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DQRANK uses the LINPACK subroutine DQRDC to compute the QR
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factorization, with column pivoting, of an M by N matrix A.
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The numerical rank is determined using the tolerance TOL.
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Note that on output, ABS ( A(1,1) ) / ABS ( A(KR,KR) ) is an estimate
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of the condition number of the matrix of independent columns,
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and of R. This estimate will be <= 1/TOL.
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Licensing:
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This code is distributed under the GNU LGPL license.
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Modified:
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21 April 2012
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Author:
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C version by John Burkardt.
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Reference:
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Jack Dongarra, Cleve Moler, Jim Bunch, Pete Stewart,
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LINPACK User's Guide,
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SIAM, 1979,
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ISBN13: 978-0-898711-72-1,
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LC: QA214.L56.
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Parameters:
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Input/output, float A[LDA*N]. On input, the matrix whose
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decomposition is to be computed. On output, the information from DQRDC.
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The triangular matrix R of the QR factorization is contained in the
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upper triangle and information needed to recover the orthogonal
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matrix Q is stored below the diagonal in A and in the vector QRAUX.
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Input, int LDA, the leading dimension of A, which must
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be at least M.
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Input, int M, the number of rows of A.
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Input, int N, the number of columns of A.
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Input, float TOL, a relative tolerance used to determine the
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numerical rank. The problem should be scaled so that all the elements
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of A have roughly the same absolute accuracy, EPS. Then a reasonable
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value for TOL is roughly EPS divided by the magnitude of the largest
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element.
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Output, int *KR, the numerical rank.
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Output, int JPVT[N], the pivot information from DQRDC.
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Columns JPVT(1), ..., JPVT(KR) of the original matrix are linearly
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independent to within the tolerance TOL and the remaining columns
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are linearly dependent.
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Output, float QRAUX[N], will contain extra information defining
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the QR factorization.
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*/
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{
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float work[n];
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for (int i = 0; i < n; i++)
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jpvt[i] = 0;
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int job = 1;
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dqrdc(a, lda, m, n, qraux, jpvt, work, job);
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*kr = 0;
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int k = i4_min(m, n);
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for (int j = 0; j < k; j++) {
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if (r8_abs(a[j + j * lda]) <= tol * r8_abs(a[0 + 0 * lda]))
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return;
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*kr = j + 1;
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}
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}
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/******************************************************************************/
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|
|
void dqrdc(float a[], int lda, int n, int p, float qraux[], int jpvt[],
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float work[], int job)
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|
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/******************************************************************************/
|
|
/**
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|
Purpose:
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|
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DQRDC computes the QR factorization of a real rectangular matrix.
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|
|
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Discussion:
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|
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DQRDC uses Householder transformations.
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|
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Column pivoting based on the 2-norms of the reduced columns may be
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performed at the user's option.
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Licensing:
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|
|
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This code is distributed under the GNU LGPL license.
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|
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Modified:
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|
|
|
07 June 2005
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|
|
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Author:
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|
|
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C version by John Burkardt.
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|
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Reference:
|
|
|
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Jack Dongarra, Cleve Moler, Jim Bunch and Pete Stewart,
|
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LINPACK User's Guide,
|
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SIAM, (Society for Industrial and Applied Mathematics),
|
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3600 University City Science Center,
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Philadelphia, PA, 19104-2688.
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ISBN 0-89871-172-X
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Parameters:
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Input/output, float A(LDA,P). On input, the N by P matrix
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whose decomposition is to be computed. On output, A contains in
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its upper triangle the upper triangular matrix R of the QR
|
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factorization. Below its diagonal A contains information from
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which the orthogonal part of the decomposition can be recovered.
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Note that if pivoting has been requested, the decomposition is not that
|
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of the original matrix A but that of A with its columns permuted
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as described by JPVT.
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Input, int LDA, the leading dimension of the array A. LDA must
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be at least N.
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Input, int N, the number of rows of the matrix A.
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Input, int P, the number of columns of the matrix A.
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Output, float QRAUX[P], contains further information required
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to recover the orthogonal part of the decomposition.
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Input/output, integer JPVT[P]. On input, JPVT contains integers that
|
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control the selection of the pivot columns. The K-th column A(*,K) of A
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is placed in one of three classes according to the value of JPVT(K).
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> 0, then A(K) is an initial column.
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= 0, then A(K) is a free column.
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< 0, then A(K) is a final column.
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Before the decomposition is computed, initial columns are moved to
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the beginning of the array A and final columns to the end. Both
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initial and final columns are frozen in place during the computation
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and only free columns are moved. At the K-th stage of the
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reduction, if A(*,K) is occupied by a free column it is interchanged
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with the free column of largest reduced norm. JPVT is not referenced
|
|
if JOB == 0. On output, JPVT(K) contains the index of the column of the
|
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original matrix that has been interchanged into the K-th column, if
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pivoting was requested.
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Workspace, float WORK[P]. WORK is not referenced if JOB == 0.
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Input, int JOB, initiates column pivoting.
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0, no pivoting is done.
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nonzero, pivoting is done.
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*/
|
|
{
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int jp;
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int j;
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int lup;
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int maxj;
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float maxnrm, nrmxl, t, tt;
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int pl = 1, pu = 0;
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/**
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If pivoting is requested, rearrange the columns.
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*/
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if (job != 0) {
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for (j = 1; j <= p; j++) {
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int swapj = (0 < jpvt[j - 1]);
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jpvt[j - 1] = (jpvt[j - 1] < 0) ? -j : j;
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if (swapj) {
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if (j != pl)
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dswap(n, a + 0 + (pl - 1)*lda, 1, a + 0 + (j - 1), 1);
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jpvt[j - 1] = jpvt[pl - 1];
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jpvt[pl - 1] = j;
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pl++;
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}
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}
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pu = p;
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for (j = p; 1 <= j; j--) {
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if (jpvt[j - 1] < 0) {
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jpvt[j - 1] = -jpvt[j - 1];
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if (j != pu) {
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dswap(n, a + 0 + (pu - 1)*lda, 1, a + 0 + (j - 1)*lda, 1);
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jp = jpvt[pu - 1];
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jpvt[pu - 1] = jpvt[j - 1];
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jpvt[j - 1] = jp;
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}
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pu = pu - 1;
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}
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}
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}
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/**
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Compute the norms of the free columns.
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*/
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for (j = pl; j <= pu; j++)
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qraux[j - 1] = dnrm2(n, a + 0 + (j - 1) * lda, 1);
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for (j = pl; j <= pu; j++)
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work[j - 1] = qraux[j - 1];
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/**
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Perform the Householder reduction of A.
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*/
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lup = i4_min(n, p);
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for (int l = 1; l <= lup; l++) {
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/**
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Bring the column of largest norm into the pivot position.
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*/
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if (pl <= l && l < pu) {
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maxnrm = 0.0;
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maxj = l;
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for (j = l; j <= pu; j++) {
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if (maxnrm < qraux[j - 1]) {
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maxnrm = qraux[j - 1];
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maxj = j;
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}
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|
}
|
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if (maxj != l) {
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dswap(n, a + 0 + (l - 1)*lda, 1, a + 0 + (maxj - 1)*lda, 1);
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qraux[maxj - 1] = qraux[l - 1];
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work[maxj - 1] = work[l - 1];
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jp = jpvt[maxj - 1];
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jpvt[maxj - 1] = jpvt[l - 1];
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jpvt[l - 1] = jp;
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}
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}
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/**
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Compute the Householder transformation for column L.
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|
*/
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qraux[l - 1] = 0.0;
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|
if (l != n) {
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nrmxl = dnrm2(n - l + 1, a + l - 1 + (l - 1) * lda, 1);
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if (nrmxl != 0.0) {
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if (a[l - 1 + (l - 1)*lda] != 0.0)
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nrmxl = nrmxl * r8_sign(a[l - 1 + (l - 1) * lda]);
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dscal(n - l + 1, 1.0 / nrmxl, a + l - 1 + (l - 1)*lda, 1);
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a[l - 1 + (l - 1)*lda] = 1.0 + a[l - 1 + (l - 1) * lda];
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/**
|
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Apply the transformation to the remaining columns, updating the norms.
|
|
*/
|
|
for (j = l + 1; j <= p; j++) {
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t = -ddot(n - l + 1, a + l - 1 + (l - 1) * lda, 1, a + l - 1 + (j - 1) * lda, 1)
|
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/ a[l - 1 + (l - 1) * lda];
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daxpy(n - l + 1, t, a + l - 1 + (l - 1)*lda, 1, a + l - 1 + (j - 1)*lda, 1);
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if (pl <= j && j <= pu) {
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if (qraux[j - 1] != 0.0) {
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tt = 1.0 - pow(r8_abs(a[l - 1 + (j - 1) * lda]) / qraux[j - 1], 2);
|
|
tt = r8_max(tt, 0.0);
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t = tt;
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tt = 1.0 + 0.05 * tt * pow(qraux[j - 1] / work[j - 1], 2);
|
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if (tt != 1.0)
|
|
qraux[j - 1] = qraux[j - 1] * sqrt(t);
|
|
else {
|
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qraux[j - 1] = dnrm2(n - l, a + l + (j - 1) * lda, 1);
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work[j - 1] = qraux[j - 1];
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|
}
|
|
}
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}
|
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}
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/**
|
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Save the transformation.
|
|
*/
|
|
qraux[l - 1] = a[l - 1 + (l - 1) * lda];
|
|
a[l - 1 + (l - 1)*lda] = -nrmxl;
|
|
}
|
|
}
|
|
}
|
|
}
|
|
/******************************************************************************/
|
|
|
|
int dqrls(float a[], int lda, int m, int n, float tol, int* kr, float b[],
|
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float x[], float rsd[], int jpvt[], float qraux[], int itask)
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|
|
/******************************************************************************/
|
|
/**
|
|
Purpose:
|
|
|
|
DQRLS factors and solves a linear system in the least squares sense.
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|
|
|
Discussion:
|
|
|
|
The linear system may be overdetermined, underdetermined or singular.
|
|
The solution is obtained using a QR factorization of the
|
|
coefficient matrix.
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|
|
DQRLS can be efficiently used to solve several least squares
|
|
problems with the same matrix A. The first system is solved
|
|
with ITASK = 1. The subsequent systems are solved with
|
|
ITASK = 2, to avoid the recomputation of the matrix factors.
|
|
The parameters KR, JPVT, and QRAUX must not be modified
|
|
between calls to DQRLS.
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|
|
DQRLS is used to solve in a least squares sense
|
|
overdetermined, underdetermined and singular linear systems.
|
|
The system is A*X approximates B where A is M by N.
|
|
B is a given M-vector, and X is the N-vector to be computed.
|
|
A solution X is found which minimimzes the sum of squares (2-norm)
|
|
of the residual, A*X - B.
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|
|
The numerical rank of A is determined using the tolerance TOL.
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|
|
|
DQRLS uses the LINPACK subroutine DQRDC to compute the QR
|
|
factorization, with column pivoting, of an M by N matrix A.
|
|
|
|
Licensing:
|
|
|
|
This code is distributed under the GNU LGPL license.
|
|
|
|
Modified:
|
|
|
|
10 September 2012
|
|
|
|
Author:
|
|
|
|
C version by John Burkardt.
|
|
|
|
Reference:
|
|
|
|
David Kahaner, Cleve Moler, Steven Nash,
|
|
Numerical Methods and Software,
|
|
Prentice Hall, 1989,
|
|
ISBN: 0-13-627258-4,
|
|
LC: TA345.K34.
|
|
|
|
Parameters:
|
|
|
|
Input/output, float A[LDA*N], an M by N matrix.
|
|
On input, the matrix whose decomposition is to be computed.
|
|
In a least squares data fitting problem, A(I,J) is the
|
|
value of the J-th basis (model) function at the I-th data point.
|
|
On output, A contains the output from DQRDC. The triangular matrix R
|
|
of the QR factorization is contained in the upper triangle and
|
|
information needed to recover the orthogonal matrix Q is stored
|
|
below the diagonal in A and in the vector QRAUX.
|
|
|
|
Input, int LDA, the leading dimension of A.
|
|
|
|
Input, int M, the number of rows of A.
|
|
|
|
Input, int N, the number of columns of A.
|
|
|
|
Input, float TOL, a relative tolerance used to determine the
|
|
numerical rank. The problem should be scaled so that all the elements
|
|
of A have roughly the same absolute accuracy EPS. Then a reasonable
|
|
value for TOL is roughly EPS divided by the magnitude of the largest
|
|
element.
|
|
|
|
Output, int *KR, the numerical rank.
|
|
|
|
Input, float B[M], the right hand side of the linear system.
|
|
|
|
Output, float X[N], a least squares solution to the linear
|
|
system.
|
|
|
|
Output, float RSD[M], the residual, B - A*X. RSD may
|
|
overwrite B.
|
|
|
|
Workspace, int JPVT[N], required if ITASK = 1.
|
|
Columns JPVT(1), ..., JPVT(KR) of the original matrix are linearly
|
|
independent to within the tolerance TOL and the remaining columns
|
|
are linearly dependent. ABS ( A(1,1) ) / ABS ( A(KR,KR) ) is an estimate
|
|
of the condition number of the matrix of independent columns,
|
|
and of R. This estimate will be <= 1/TOL.
|
|
|
|
Workspace, float QRAUX[N], required if ITASK = 1.
|
|
|
|
Input, int ITASK.
|
|
1, DQRLS factors the matrix A and solves the least squares problem.
|
|
2, DQRLS assumes that the matrix A was factored with an earlier
|
|
call to DQRLS, and only solves the least squares problem.
|
|
|
|
Output, int DQRLS, error code.
|
|
0: no error
|
|
-1: LDA < M (fatal error)
|
|
-2: N < 1 (fatal error)
|
|
-3: ITASK < 1 (fatal error)
|
|
*/
|
|
{
|
|
int ind;
|
|
if (lda < m) {
|
|
/*fprintf ( stderr, "\n" );
|
|
fprintf ( stderr, "DQRLS - Fatal error!\n" );
|
|
fprintf ( stderr, " LDA < M.\n" );*/
|
|
ind = -1;
|
|
return ind;
|
|
}
|
|
|
|
if (n <= 0) {
|
|
/*fprintf ( stderr, "\n" );
|
|
fprintf ( stderr, "DQRLS - Fatal error!\n" );
|
|
fprintf ( stderr, " N <= 0.\n" );*/
|
|
ind = -2;
|
|
return ind;
|
|
}
|
|
|
|
if (itask < 1) {
|
|
/*fprintf ( stderr, "\n" );
|
|
fprintf ( stderr, "DQRLS - Fatal error!\n" );
|
|
fprintf ( stderr, " ITASK < 1.\n" );*/
|
|
ind = -3;
|
|
return ind;
|
|
}
|
|
|
|
ind = 0;
|
|
/**
|
|
Factor the matrix.
|
|
*/
|
|
if (itask == 1)
|
|
dqrank(a, lda, m, n, tol, kr, jpvt, qraux);
|
|
/**
|
|
Solve the least-squares problem.
|
|
*/
|
|
dqrlss(a, lda, m, n, *kr, b, x, rsd, jpvt, qraux);
|
|
return ind;
|
|
}
|
|
/******************************************************************************/
|
|
|
|
void dqrlss(float a[], int lda, int m, int n, int kr, float b[], float x[],
|
|
float rsd[], int jpvt[], float qraux[])
|
|
|
|
/******************************************************************************/
|
|
/**
|
|
Purpose:
|
|
|
|
DQRLSS solves a linear system in a least squares sense.
|
|
|
|
Discussion:
|
|
|
|
DQRLSS must be preceded by a call to DQRANK.
|
|
|
|
The system is to be solved is
|
|
A * X = B
|
|
where
|
|
A is an M by N matrix with rank KR, as determined by DQRANK,
|
|
B is a given M-vector,
|
|
X is the N-vector to be computed.
|
|
|
|
A solution X, with at most KR nonzero components, is found which
|
|
minimizes the 2-norm of the residual (A*X-B).
|
|
|
|
Once the matrix A has been formed, DQRANK should be
|
|
called once to decompose it. Then, for each right hand
|
|
side B, DQRLSS should be called once to obtain the
|
|
solution and residual.
|
|
|
|
Licensing:
|
|
|
|
This code is distributed under the GNU LGPL license.
|
|
|
|
Modified:
|
|
|
|
10 September 2012
|
|
|
|
Author:
|
|
|
|
C version by John Burkardt
|
|
|
|
Parameters:
|
|
|
|
Input, float A[LDA*N], the QR factorization information
|
|
from DQRANK. The triangular matrix R of the QR factorization is
|
|
contained in the upper triangle and information needed to recover
|
|
the orthogonal matrix Q is stored below the diagonal in A and in
|
|
the vector QRAUX.
|
|
|
|
Input, int LDA, the leading dimension of A, which must
|
|
be at least M.
|
|
|
|
Input, int M, the number of rows of A.
|
|
|
|
Input, int N, the number of columns of A.
|
|
|
|
Input, int KR, the rank of the matrix, as estimated by DQRANK.
|
|
|
|
Input, float B[M], the right hand side of the linear system.
|
|
|
|
Output, float X[N], a least squares solution to the
|
|
linear system.
|
|
|
|
Output, float RSD[M], the residual, B - A*X. RSD may
|
|
overwrite B.
|
|
|
|
Input, int JPVT[N], the pivot information from DQRANK.
|
|
Columns JPVT[0], ..., JPVT[KR-1] of the original matrix are linearly
|
|
independent to within the tolerance TOL and the remaining columns
|
|
are linearly dependent.
|
|
|
|
Input, float QRAUX[N], auxiliary information from DQRANK
|
|
defining the QR factorization.
|
|
*/
|
|
{
|
|
int i;
|
|
int info;
|
|
int j;
|
|
int job;
|
|
int k;
|
|
float t;
|
|
|
|
if (kr != 0) {
|
|
job = 110;
|
|
info = dqrsl(a, lda, m, kr, qraux, b, rsd, rsd, x, rsd, rsd, job); UNUSED(info);
|
|
}
|
|
|
|
for (i = 0; i < n; i++)
|
|
jpvt[i] = - jpvt[i];
|
|
|
|
for (i = kr; i < n; i++)
|
|
x[i] = 0.0;
|
|
|
|
for (j = 1; j <= n; j++) {
|
|
if (jpvt[j - 1] <= 0) {
|
|
k = - jpvt[j - 1];
|
|
jpvt[j - 1] = k;
|
|
|
|
while (k != j) {
|
|
t = x[j - 1];
|
|
x[j - 1] = x[k - 1];
|
|
x[k - 1] = t;
|
|
jpvt[k - 1] = -jpvt[k - 1];
|
|
k = jpvt[k - 1];
|
|
}
|
|
}
|
|
}
|
|
}
|
|
/******************************************************************************/
|
|
|
|
int dqrsl(float a[], int lda, int n, int k, float qraux[], float y[],
|
|
float qy[], float qty[], float b[], float rsd[], float ab[], int job)
|
|
|
|
/******************************************************************************/
|
|
/**
|
|
Purpose:
|
|
|
|
DQRSL computes transformations, projections, and least squares solutions.
|
|
|
|
Discussion:
|
|
|
|
DQRSL requires the output of DQRDC.
|
|
|
|
For K <= min(N,P), let AK be the matrix
|
|
|
|
AK = ( A(JPVT[0]), A(JPVT(2)), ..., A(JPVT(K)) )
|
|
|
|
formed from columns JPVT[0], ..., JPVT(K) of the original
|
|
N by P matrix A that was input to DQRDC. If no pivoting was
|
|
done, AK consists of the first K columns of A in their
|
|
original order. DQRDC produces a factored orthogonal matrix Q
|
|
and an upper triangular matrix R such that
|
|
|
|
AK = Q * (R)
|
|
(0)
|
|
|
|
This information is contained in coded form in the arrays
|
|
A and QRAUX.
|
|
|
|
The parameters QY, QTY, B, RSD, and AB are not referenced
|
|
if their computation is not requested and in this case
|
|
can be replaced by dummy variables in the calling program.
|
|
To save storage, the user may in some cases use the same
|
|
array for different parameters in the calling sequence. A
|
|
frequently occurring example is when one wishes to compute
|
|
any of B, RSD, or AB and does not need Y or QTY. In this
|
|
case one may identify Y, QTY, and one of B, RSD, or AB, while
|
|
providing separate arrays for anything else that is to be
|
|
computed.
|
|
|
|
Thus the calling sequence
|
|
|
|
dqrsl ( a, lda, n, k, qraux, y, dum, y, b, y, dum, 110, info )
|
|
|
|
will result in the computation of B and RSD, with RSD
|
|
overwriting Y. More generally, each item in the following
|
|
list contains groups of permissible identifications for
|
|
a single calling sequence.
|
|
|
|
1. (Y,QTY,B) (RSD) (AB) (QY)
|
|
|
|
2. (Y,QTY,RSD) (B) (AB) (QY)
|
|
|
|
3. (Y,QTY,AB) (B) (RSD) (QY)
|
|
|
|
4. (Y,QY) (QTY,B) (RSD) (AB)
|
|
|
|
5. (Y,QY) (QTY,RSD) (B) (AB)
|
|
|
|
6. (Y,QY) (QTY,AB) (B) (RSD)
|
|
|
|
In any group the value returned in the array allocated to
|
|
the group corresponds to the last member of the group.
|
|
|
|
Licensing:
|
|
|
|
This code is distributed under the GNU LGPL license.
|
|
|
|
Modified:
|
|
|
|
07 June 2005
|
|
|
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Author:
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C version by John Burkardt.
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Reference:
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Jack Dongarra, Cleve Moler, Jim Bunch and Pete Stewart,
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LINPACK User's Guide,
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SIAM, (Society for Industrial and Applied Mathematics),
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3600 University City Science Center,
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Philadelphia, PA, 19104-2688.
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ISBN 0-89871-172-X
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Parameters:
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Input, float A[LDA*P], contains the output of DQRDC.
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Input, int LDA, the leading dimension of the array A.
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Input, int N, the number of rows of the matrix AK. It must
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have the same value as N in DQRDC.
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Input, int K, the number of columns of the matrix AK. K
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must not be greater than min(N,P), where P is the same as in the
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calling sequence to DQRDC.
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Input, float QRAUX[P], the auxiliary output from DQRDC.
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Input, float Y[N], a vector to be manipulated by DQRSL.
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Output, float QY[N], contains Q * Y, if requested.
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Output, float QTY[N], contains Q' * Y, if requested.
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Output, float B[K], the solution of the least squares problem
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minimize norm2 ( Y - AK * B),
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if its computation has been requested. Note that if pivoting was
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requested in DQRDC, the J-th component of B will be associated with
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column JPVT(J) of the original matrix A that was input into DQRDC.
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Output, float RSD[N], the least squares residual Y - AK * B,
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if its computation has been requested. RSD is also the orthogonal
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projection of Y onto the orthogonal complement of the column space
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of AK.
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Output, float AB[N], the least squares approximation Ak * B,
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if its computation has been requested. AB is also the orthogonal
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projection of Y onto the column space of A.
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Input, integer JOB, specifies what is to be computed. JOB has
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the decimal expansion ABCDE, with the following meaning:
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if A != 0, compute QY.
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if B != 0, compute QTY.
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if C != 0, compute QTY and B.
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if D != 0, compute QTY and RSD.
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if E != 0, compute QTY and AB.
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Note that a request to compute B, RSD, or AB automatically triggers
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the computation of QTY, for which an array must be provided in the
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calling sequence.
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Output, int DQRSL, is zero unless the computation of B has
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been requested and R is exactly singular. In this case, INFO is the
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index of the first zero diagonal element of R, and B is left unaltered.
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*/
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{
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int cab;
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int cb;
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int cqty;
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int cqy;
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int cr;
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int i;
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int info;
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int j;
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int jj;
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int ju;
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float t;
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float temp;
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/**
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Set INFO flag.
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*/
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info = 0;
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/**
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Determine what is to be computed.
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*/
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cqy = ( job / 10000 != 0);
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cqty = ((job % 10000) != 0);
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cb = ((job % 1000) / 100 != 0);
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cr = ((job % 100) / 10 != 0);
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cab = ((job % 10) != 0);
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ju = i4_min(k, n - 1);
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/**
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Special action when N = 1.
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*/
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if (ju == 0) {
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if (cqy)
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qy[0] = y[0];
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if (cqty)
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qty[0] = y[0];
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if (cab)
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ab[0] = y[0];
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if (cb) {
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if (a[0 + 0 * lda] == 0.0)
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info = 1;
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else
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b[0] = y[0] / a[0 + 0 * lda];
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}
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if (cr)
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rsd[0] = 0.0;
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return info;
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}
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/**
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Set up to compute QY or QTY.
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*/
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if (cqy) {
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for (i = 1; i <= n; i++)
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qy[i - 1] = y[i - 1];
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}
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if (cqty) {
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for (i = 1; i <= n; i++)
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qty[i - 1] = y[i - 1];
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}
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/**
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Compute QY.
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*/
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if (cqy) {
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for (jj = 1; jj <= ju; jj++) {
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j = ju - jj + 1;
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if (qraux[j - 1] != 0.0) {
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temp = a[j - 1 + (j - 1) * lda];
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a[j - 1 + (j - 1)*lda] = qraux[j - 1];
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t = -ddot(n - j + 1, a + j - 1 + (j - 1) * lda, 1, qy + j - 1, 1) / a[j - 1 + (j - 1) * lda];
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daxpy(n - j + 1, t, a + j - 1 + (j - 1)*lda, 1, qy + j - 1, 1);
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a[j - 1 + (j - 1)*lda] = temp;
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}
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}
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}
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/**
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Compute Q'*Y.
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*/
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if (cqty) {
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for (j = 1; j <= ju; j++) {
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if (qraux[j - 1] != 0.0) {
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temp = a[j - 1 + (j - 1) * lda];
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a[j - 1 + (j - 1)*lda] = qraux[j - 1];
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t = -ddot(n - j + 1, a + j - 1 + (j - 1) * lda, 1, qty + j - 1, 1) / a[j - 1 + (j - 1) * lda];
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daxpy(n - j + 1, t, a + j - 1 + (j - 1)*lda, 1, qty + j - 1, 1);
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a[j - 1 + (j - 1)*lda] = temp;
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}
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}
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}
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/**
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Set up to compute B, RSD, or AB.
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*/
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if (cb) {
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for (i = 1; i <= k; i++)
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b[i - 1] = qty[i - 1];
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}
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if (cab) {
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for (i = 1; i <= k; i++)
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ab[i - 1] = qty[i - 1];
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}
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if (cr && k < n) {
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for (i = k + 1; i <= n; i++)
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rsd[i - 1] = qty[i - 1];
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}
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if (cab && k + 1 <= n) {
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for (i = k + 1; i <= n; i++)
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ab[i - 1] = 0.0;
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}
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if (cr) {
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for (i = 1; i <= k; i++)
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rsd[i - 1] = 0.0;
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}
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/**
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Compute B.
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*/
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if (cb) {
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for (jj = 1; jj <= k; jj++) {
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j = k - jj + 1;
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if (a[j - 1 + (j - 1)*lda] == 0.0) {
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info = j;
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break;
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}
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b[j - 1] = b[j - 1] / a[j - 1 + (j - 1) * lda];
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if (j != 1) {
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t = -b[j - 1];
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daxpy(j - 1, t, a + 0 + (j - 1)*lda, 1, b, 1);
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}
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}
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}
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/**
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Compute RSD or AB as required.
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*/
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if (cr || cab) {
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for (jj = 1; jj <= ju; jj++) {
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j = ju - jj + 1;
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if (qraux[j - 1] != 0.0) {
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temp = a[j - 1 + (j - 1) * lda];
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a[j - 1 + (j - 1)*lda] = qraux[j - 1];
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if (cr) {
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t = -ddot(n - j + 1, a + j - 1 + (j - 1) * lda, 1, rsd + j - 1, 1)
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/ a[j - 1 + (j - 1) * lda];
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daxpy(n - j + 1, t, a + j - 1 + (j - 1)*lda, 1, rsd + j - 1, 1);
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}
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if (cab) {
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t = -ddot(n - j + 1, a + j - 1 + (j - 1) * lda, 1, ab + j - 1, 1)
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/ a[j - 1 + (j - 1) * lda];
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daxpy(n - j + 1, t, a + j - 1 + (j - 1)*lda, 1, ab + j - 1, 1);
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}
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a[j - 1 + (j - 1)*lda] = temp;
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}
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}
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}
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return info;
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}
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/******************************************************************************/
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/******************************************************************************/
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void dscal(int n, float sa, float x[], int incx)
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/******************************************************************************/
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/**
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Purpose:
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DSCAL scales a vector by a constant.
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Licensing:
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This code is distributed under the GNU LGPL license.
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Modified:
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30 March 2007
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Author:
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|
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C version by John Burkardt
|
|
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Reference:
|
|
|
|
Jack Dongarra, Cleve Moler, Jim Bunch, Pete Stewart,
|
|
LINPACK User's Guide,
|
|
SIAM, 1979.
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|
|
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Charles Lawson, Richard Hanson, David Kincaid, Fred Krogh,
|
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Basic Linear Algebra Subprograms for Fortran Usage,
|
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Algorithm 539,
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ACM Transactions on Mathematical Software,
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Volume 5, Number 3, September 1979, pages 308-323.
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Parameters:
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Input, int N, the number of entries in the vector.
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Input, float SA, the multiplier.
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Input/output, float X[*], the vector to be scaled.
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Input, int INCX, the increment between successive entries of X.
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*/
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{
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int i;
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int ix;
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int m;
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if (n <= 0) return;
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if (incx == 1) {
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m = n % 5;
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for (i = 0; i < m; i++)
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x[i] = sa * x[i];
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for (i = m; i < n; i = i + 5) {
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x[i] = sa * x[i];
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x[i + 1] = sa * x[i + 1];
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x[i + 2] = sa * x[i + 2];
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x[i + 3] = sa * x[i + 3];
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x[i + 4] = sa * x[i + 4];
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}
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}
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else {
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if (0 <= incx)
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ix = 0;
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else
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ix = (- n + 1) * incx;
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for (i = 0; i < n; i++) {
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x[ix] = sa * x[ix];
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ix = ix + incx;
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}
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}
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}
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/******************************************************************************/
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void dswap(int n, float x[], int incx, float y[], int incy)
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/******************************************************************************/
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/**
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Purpose:
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DSWAP interchanges two vectors.
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Licensing:
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This code is distributed under the GNU LGPL license.
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|
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Modified:
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|
30 March 2007
|
|
|
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Author:
|
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|
|
C version by John Burkardt
|
|
|
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Reference:
|
|
|
|
Jack Dongarra, Cleve Moler, Jim Bunch, Pete Stewart,
|
|
LINPACK User's Guide,
|
|
SIAM, 1979.
|
|
|
|
Charles Lawson, Richard Hanson, David Kincaid, Fred Krogh,
|
|
Basic Linear Algebra Subprograms for Fortran Usage,
|
|
Algorithm 539,
|
|
ACM Transactions on Mathematical Software,
|
|
Volume 5, Number 3, September 1979, pages 308-323.
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|
|
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Parameters:
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|
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Input, int N, the number of entries in the vectors.
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Input/output, float X[*], one of the vectors to swap.
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Input, int INCX, the increment between successive entries of X.
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Input/output, float Y[*], one of the vectors to swap.
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Input, int INCY, the increment between successive elements of Y.
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*/
|
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{
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if (n <= 0) return;
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int i, ix, iy, m;
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float temp;
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|
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if (incx == 1 && incy == 1) {
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m = n % 3;
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for (i = 0; i < m; i++) {
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temp = x[i];
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x[i] = y[i];
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y[i] = temp;
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}
|
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for (i = m; i < n; i = i + 3) {
|
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temp = x[i];
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x[i] = y[i];
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y[i] = temp;
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temp = x[i + 1];
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x[i + 1] = y[i + 1];
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y[i + 1] = temp;
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temp = x[i + 2];
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x[i + 2] = y[i + 2];
|
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y[i + 2] = temp;
|
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}
|
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}
|
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else {
|
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ix = (incx >= 0) ? 0 : (-n + 1) * incx;
|
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iy = (incy >= 0) ? 0 : (-n + 1) * incy;
|
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for (i = 0; i < n; i++) {
|
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temp = x[ix];
|
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x[ix] = y[iy];
|
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y[iy] = temp;
|
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ix = ix + incx;
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iy = iy + incy;
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}
|
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}
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}
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/******************************************************************************/
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/******************************************************************************/
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|
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void qr_solve(float x[], int m, int n, float a[], float b[])
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|
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/******************************************************************************/
|
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/**
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|
Purpose:
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|
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QR_SOLVE solves a linear system in the least squares sense.
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|
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Discussion:
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|
|
If the matrix A has full column rank, then the solution X should be the
|
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unique vector that minimizes the Euclidean norm of the residual.
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|
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If the matrix A does not have full column rank, then the solution is
|
|
not unique; the vector X will minimize the residual norm, but so will
|
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various other vectors.
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|
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Licensing:
|
|
|
|
This code is distributed under the GNU LGPL license.
|
|
|
|
Modified:
|
|
|
|
11 September 2012
|
|
|
|
Author:
|
|
|
|
John Burkardt
|
|
|
|
Reference:
|
|
|
|
David Kahaner, Cleve Moler, Steven Nash,
|
|
Numerical Methods and Software,
|
|
Prentice Hall, 1989,
|
|
ISBN: 0-13-627258-4,
|
|
LC: TA345.K34.
|
|
|
|
Parameters:
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|
|
Input, int M, the number of rows of A.
|
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|
|
Input, int N, the number of columns of A.
|
|
|
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Input, float A[M*N], the matrix.
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|
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Input, float B[M], the right hand side.
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|
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Output, float QR_SOLVE[N], the least squares solution.
|
|
*/
|
|
{
|
|
float a_qr[n * m], qraux[n], r[m], tol;
|
|
int ind, itask, jpvt[n], kr, lda;
|
|
|
|
r8mat_copy(a_qr, m, n, a);
|
|
lda = m;
|
|
tol = r8_epsilon() / r8mat_amax(m, n, a_qr);
|
|
itask = 1;
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|
|
ind = dqrls(a_qr, lda, m, n, tol, &kr, b, x, r, jpvt, qraux, itask); UNUSED(ind);
|
|
}
|
|
/******************************************************************************/
|
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|
|
#endif
|