[3839] | 1 | /*************************************************************************
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| 2 | Copyright (c) 2005-2007, Sergey Bochkanov (ALGLIB project).
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| 3 |
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| 4 | >>> SOURCE LICENSE >>>
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| 5 | This program is free software; you can redistribute it and/or modify
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| 6 | it under the terms of the GNU General Public License as published by
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| 7 | the Free Software Foundation (www.fsf.org); either version 2 of the
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| 8 | License, or (at your option) any later version.
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| 9 |
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| 10 | This program is distributed in the hope that it will be useful,
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| 11 | but WITHOUT ANY WARRANTY; without even the implied warranty of
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| 12 | MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the
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| 13 | GNU General Public License for more details.
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| 14 |
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| 15 | A copy of the GNU General Public License is available at
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| 16 | http://www.fsf.org/licensing/licenses
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| 17 |
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| 18 | >>> END OF LICENSE >>>
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| 19 | *************************************************************************/
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| 20 |
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| 21 | using System;
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| 22 |
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| 23 | namespace alglib
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| 24 | {
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| 25 | public class sdet
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| 26 | {
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| 27 | /*************************************************************************
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| 28 | Determinant calculation of the matrix given by LDLT decomposition.
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| 29 |
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| 30 | Input parameters:
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| 31 | A - LDLT-decomposition of the matrix,
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| 32 | output of subroutine SMatrixLDLT.
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| 33 | Pivots - table of permutations which were made during
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| 34 | LDLT decomposition, output of subroutine SMatrixLDLT.
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| 35 | N - size of matrix A.
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| 36 | IsUpper - matrix storage format. The value is equal to the input
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| 37 | parameter of subroutine SMatrixLDLT.
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| 38 |
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| 39 | Result:
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| 40 | matrix determinant.
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| 41 |
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| 42 | -- ALGLIB --
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| 43 | Copyright 2005-2008 by Bochkanov Sergey
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| 44 | *************************************************************************/
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| 45 | public static double smatrixldltdet(ref double[,] a,
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| 46 | ref int[] pivots,
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| 47 | int n,
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| 48 | bool isupper)
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| 49 | {
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| 50 | double result = 0;
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| 51 | int k = 0;
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| 52 |
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| 53 | result = 1;
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| 54 | if( isupper )
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| 55 | {
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| 56 | k = 0;
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| 57 | while( k<n )
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| 58 | {
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| 59 | if( pivots[k]>=0 )
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| 60 | {
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| 61 | result = result*a[k,k];
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| 62 | k = k+1;
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| 63 | }
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| 64 | else
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| 65 | {
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| 66 | result = result*(a[k,k]*a[k+1,k+1]-a[k,k+1]*a[k,k+1]);
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| 67 | k = k+2;
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| 68 | }
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| 69 | }
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| 70 | }
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| 71 | else
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| 72 | {
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| 73 | k = n-1;
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| 74 | while( k>=0 )
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| 75 | {
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| 76 | if( pivots[k]>=0 )
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| 77 | {
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| 78 | result = result*a[k,k];
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| 79 | k = k-1;
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| 80 | }
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| 81 | else
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| 82 | {
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| 83 | result = result*(a[k-1,k-1]*a[k,k]-a[k,k-1]*a[k,k-1]);
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| 84 | k = k-2;
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| 85 | }
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| 86 | }
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| 87 | }
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| 88 | return result;
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| 89 | }
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| 90 |
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| 91 |
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| 92 | /*************************************************************************
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| 93 | Determinant calculation of the symmetric matrix
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| 94 |
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| 95 | Input parameters:
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| 96 | A - matrix. Array with elements [0..N-1, 0..N-1].
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| 97 | N - size of matrix A.
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| 98 | IsUpper - if IsUpper = True, then symmetric matrix A is given by its
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| 99 | upper triangle, and the lower triangle isnt used by
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| 100 | subroutine. Similarly, if IsUpper = False, then A is given
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| 101 | by its lower triangle.
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| 102 |
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| 103 | Result:
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| 104 | determinant of matrix A.
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| 105 |
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| 106 | -- ALGLIB --
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| 107 | Copyright 2005-2008 by Bochkanov Sergey
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| 108 | *************************************************************************/
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| 109 | public static double smatrixdet(double[,] a,
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| 110 | int n,
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| 111 | bool isupper)
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| 112 | {
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| 113 | double result = 0;
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| 114 | int[] pivots = new int[0];
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| 115 |
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| 116 | a = (double[,])a.Clone();
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| 117 |
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| 118 | ldlt.smatrixldlt(ref a, n, isupper, ref pivots);
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| 119 | result = smatrixldltdet(ref a, ref pivots, n, isupper);
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| 120 | return result;
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| 121 | }
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| 122 |
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| 123 |
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| 124 | public static double determinantldlt(ref double[,] a,
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| 125 | ref int[] pivots,
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| 126 | int n,
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| 127 | bool isupper)
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| 128 | {
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| 129 | double result = 0;
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| 130 | int k = 0;
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| 131 |
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| 132 | result = 1;
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| 133 | if( isupper )
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| 134 | {
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| 135 | k = 1;
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| 136 | while( k<=n )
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| 137 | {
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| 138 | if( pivots[k]>0 )
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| 139 | {
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| 140 | result = result*a[k,k];
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| 141 | k = k+1;
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| 142 | }
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| 143 | else
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| 144 | {
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| 145 | result = result*(a[k,k]*a[k+1,k+1]-a[k,k+1]*a[k,k+1]);
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| 146 | k = k+2;
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| 147 | }
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| 148 | }
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| 149 | }
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| 150 | else
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| 151 | {
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| 152 | k = n;
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| 153 | while( k>=1 )
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| 154 | {
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| 155 | if( pivots[k]>0 )
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| 156 | {
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| 157 | result = result*a[k,k];
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| 158 | k = k-1;
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| 159 | }
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| 160 | else
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| 161 | {
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| 162 | result = result*(a[k-1,k-1]*a[k,k]-a[k,k-1]*a[k,k-1]);
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| 163 | k = k-2;
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| 164 | }
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| 165 | }
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| 166 | }
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| 167 | return result;
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| 168 | }
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| 169 |
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| 170 |
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| 171 | public static double determinantsymmetric(double[,] a,
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| 172 | int n,
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| 173 | bool isupper)
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| 174 | {
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| 175 | double result = 0;
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| 176 | int[] pivots = new int[0];
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| 177 |
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| 178 | a = (double[,])a.Clone();
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| 179 |
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| 180 | ldlt.ldltdecomposition(ref a, n, isupper, ref pivots);
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| 181 | result = determinantldlt(ref a, ref pivots, n, isupper);
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| 182 | return result;
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| 183 | }
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| 184 | }
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| 185 | }
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