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https://github.com/ChronosX88/psyced.git
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288 lines
6.8 KiB
C
288 lines
6.8 KiB
C
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// $Id: matrix.c,v 1.10 2005/03/14 10:23:26 lynx Exp $ // vim:syntax=lpc
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//
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// just a joke, really
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//
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#include <net.h>
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#define CL_INDEX (#'[)
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#define CL_IF (#'?)
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#define CL_NIF (#'?!)
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#define CL_RANGE (#'[..])
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#define CL_L_RANGE (#'[..)
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protected int *dim(mixed M);
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protected mixed TRANS(mixed M);
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protected varargs mixed MpM(mixed A, mixed B, mixed C);
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protected varargs mixed MxM(mixed A, mixed B, mixed C);
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// delta(ij)
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protected mixed E(int n);
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// multipliziere die i-te Zeile mit x.. Ri(x) element M(nxn,K)
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protected mixed R(int n, int i, int x);
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// addiere das xfache der i-ten Zeile zur j-ten Zeile.. Qij(x) element M(nxn,K)
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// WATCH OUT: von links!
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protected mixed Q(int n, int i, int x, int j);
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// vertauscht i-te und j-te zeile
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protected mixed P(int n, int i, int j);
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// BEWARE!! the mysterious sparcematrix optimizer! (M -> L)
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//
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// transforms a matrix into its aequivalent transformation.
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// afterwards it can be used one-way.. funcall(L, some-matrix);
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// the transformed matrix is much faster in case it contains many zeros
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// and zero-lines.
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//
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//
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//
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protected closure matrix2closure(mixed matrix);
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// reverse
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protected mixed closure2matrix(closure c);
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protected string printMatrix(mixed matrix);
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protected int spur(mixed matrix);
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/*
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* Matrizen in der Form M[i][j].. , das ist per
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* Definition Mij. Also
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* i Zeilen
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* j Spalten
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*
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*
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*/
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protected int *dim(mixed M) {
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int *dim, *row;
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if (closurep(M)) return funcall(M,"dim");
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dim = ({ 0,0 });
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dim[0] = sizeof(M);
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dim[1] = sizeof(M[0]);
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if(dim[0] == 0 || dim[1] == 0) return ({ -1,-1 });
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foreach (row : M) {
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if (sizeof(row) != dim[1])
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return ({ -1,-1 });
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}
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return dim;
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}
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protected mixed TRANS(mixed M) {
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mixed *T;
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int *dimM, wantClosure, i, j;
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if(closurep(M)) {
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dimM = funcall(M,"dim");
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M = closure2matrix(M);
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wantClosure = 1;
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} else dimM = dim(M);
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if(dimM[0] == -1) return ({ -1,-1 });
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T = allocate( ({ dimM[1],dimM[0] }) );
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for (i = 0; i <= dimM[0] - 1; i++) { // loop rows of M
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for (j = 0; j <= dimM[1] - 1; j++) { // loop cols of M
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T[j][i] = M[i][j];
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}
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}
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unless (wantClosure) return T;
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return matrix2closure(T);
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}
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// can be used as A * B = C
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protected varargs mixed MxM(mixed A, mixed B, mixed C) {
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int *dimA, *dimB, *dimC, sum, i, j, k;
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if(closurep(B)) {
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dimB = funcall(B,"dim");
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B = closure2matrix(B);
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} else dimB = dim(B);
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if(closurep(A)) {
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return funcall(A,B);
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}
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dimA = dim(A); // get dimensions to check whether
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if (pointerp(C)) {
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dimC = dim(C);
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if (dimC[0] != dimB[0] || dimC[1] != dimA[1] || dimC[0] == -1) return C;
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} else {
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C = allocate( ({ dimA[0], dimB[1] }) );
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}
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if (dimA[1] != dimB[0] || dimB[0] == -1 || dimA[0] == -1) return C;
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// matrices are valid, we can start multiplication
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for (i = 0; i <= dimA[0] - 1; i++) { // loop rows of A
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for (j = 0; j <= dimB[1] - 1; j++) { // loop cols of B
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sum = 0;
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for (k = 0; k <= dimA[1] - 1; k++) { // vektor-produkt
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sum += A[i][k] * B[k][j];
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}
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C[i][j] = sum;
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}
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}
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return C;
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}
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protected varargs mixed MpM(mixed A, mixed B, mixed C) {
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int *dimA, *dimB, *dimC, j, i;
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if (closurep(A)) {
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dimA = funcall(A,"dim");
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A = closure2matrix(A);
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} else dimA = dim(A);
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if (closurep(B)) {
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dimB = funcall(B,"dim");
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B = closure2matrix(B);
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} else dimB = dim(B);
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if (pointerp(C)) {
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dimC = dim(C);
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if (dimC[0] != dimB[0] || dimC[1] != dimB[1]) return C;
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} else {
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C = allocate( ({ dimB[0], dimB[1] }) );
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}
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if (dimA[0] != dimB[0] || dimA[1] != dimB[1]) return C;
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// matrices are valid, lets start add
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for (i = 0; i <= dimA[0] - 1; i++) { // loop
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for (j = 0; j <= dimB[1] - 1; j++) { // loop
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C[i][j] = B[i][j] + A[i][j];
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}
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}
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return C;
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}
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protected mixed E(int n) {
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int i;
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mixed matrix;
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matrix = allocate(({ n,n }));
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for(i = 0; i < n; i++) {
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matrix[i][i] = 1;
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}
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return matrix;
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}
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protected mixed R(int n, int i, int x) {
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mixed matrix;
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i--;
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matrix = E(n);
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if (i < 0 || i >= n)
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return matrix;
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matrix[i][i] = x;
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return matrix;
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}
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protected mixed Q(int n, int i, int x, int j) {
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mixed matrix;
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i--; j--;
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matrix = E(n);
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if (i == j || i < 0 || j < 0 || j >= n || i >= n)
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return matrix;
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// zeile j, spalte i.. Qij(x)
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matrix[j][i] = x;
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return matrix;
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}
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// exchanges j'th and i'th rows of the matrix
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protected mixed P(int n, int i, int j) {
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mixed matrix;
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i--; j--;
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matrix = E(n);
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if (i == j || i < 0 || j < 0 || j >= n || i >= n)
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return matrix;
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matrix[i][i] = 0;
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matrix[j][i] = 1;
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matrix[i][j] = 1;
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matrix[j][j] = 0;
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return matrix;
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}
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// closure gets the matrix.. we are working on a symbol!
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// 'matrix
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// in column 'j
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//
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protected closure matrix2closure(mixed matrix) {
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int *dim = dim(matrix);
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int flag, i, j;
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mixed *c_array = ({ (#',) });
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mixed *temp;
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for (i = 0; i <= dim[0] - 1; i++) {
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flag = 0;
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temp = 0;
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for (j = 0; j <= dim[1] - 1; j++) {
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switch (matrix[i][j]) {
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case 0:
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break;
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case 1:
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flag = 1;
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temp = ({ (#'+), ({ CL_INDEX, ({ CL_INDEX, 'matrix, j }), 'j }), temp });
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break;
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default:
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flag = 1;
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temp = ({ (#'+), ({ #'*, matrix[i][j], ({ CL_INDEX, ({ CL_INDEX, 'matrix, j }), 'j }) }), temp });
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break;
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}
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}
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if (flag == 1) {
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c_array += ({ ({ #'=, ({ CL_INDEX, ({ CL_INDEX, 'matrix_out, i }), 'j }), temp }) });
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}
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}
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// P2(("%O",c_array))
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return lambda(({ 'matrix }),
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({ (#',),
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({ CL_IF, ({ #'==, 'matrix, "dim" }), ({ #'return, quote(dim) }) }),
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({ #'=, 'dim, ({ symbol_function("dim", ME), 'matrix }) }),
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({ #'=, 'alloc_dim, ({ #'({, dim[0], ({ CL_INDEX, 'dim, 1 }) }) }),
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// ({ #'=, ({ CL_INDEX, 'alloc_dim, 1 }), ({ CL_INDEX, 'dim, 1 }) }),
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({ #'=, 'matrix_out, ({ #'allocate, 'alloc_dim }) }),
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({ CL_IF, ({ #'||, ({ #'==, ({ CL_INDEX, 'dim, 0 }), -1 }),
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({ #'!=, ({ CL_INDEX, 'dim, 0 }), dim[1] }) }),
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({ #'return, 'matrix_out })
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}),
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({ #'=, 'j, 0}),
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({ #'while,
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({ #'<= , 'j, ({ #'-, ({ CL_INDEX, 'dim, 1 }), 1 }) }),
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({ #'return, 'matrix_out }),
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c_array,
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({ #'++, 'j})
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})
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})
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);
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}
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// just multiply with E
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protected mixed closure2matrix(closure c) {
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return funcall(c, E( funcall(c,"dim")[1] ) );
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}
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protected string printMatrix(mixed matrix) {
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string output;
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int *row;
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if (closurep(matrix)) matrix = closure2matrix(matrix);
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output = "";
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foreach (row : matrix) {
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output += "|\t"+ implode(map(row,#'to_string), "\t") +"\t|\n";
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}
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return output;
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}
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protected int spur(mixed matrix) {
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int *dim, c, n, spur;
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spur = 0;
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dim = dim(matrix);
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n = min(dim[0], dim[1]) - 1;
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for (c = 0; c <= n; c++) {
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spur += matrix[c][c];
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}
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return spur;
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}
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