/// <summary>Construct the singular value decomposition</summary> /// <param name="Arg"> Rectangular matrix /// </param> /// <returns> Structure to access U, S and V. /// </returns> public SingularValueDecomposition(GeneralMatrix Arg) { // Derived from LINPACK code. // Initialize. double[][] A = Arg.ArrayCopy; m = Arg.RowDimension; n = Arg.ColumnDimension; int nu = System.Math.Min(m, n); s = new double[System.Math.Min(m + 1, n)]; U = new double[m][]; for (int i = 0; i < m; i++) { U[i] = new double[nu]; } V = new double[n][]; for (int i2 = 0; i2 < n; i2++) { V[i2] = new double[n]; } double[] e = new double[n]; double[] work = new double[m]; bool wantu = true; bool wantv = true; // Reduce A to bidiagonal form, storing the diagonal elements // in s and the super-diagonal elements in e. int nct = System.Math.Min(m - 1, n); int nrt = System.Math.Max(0, System.Math.Min(n - 2, m)); for (int k = 0; k < System.Math.Max(nct, nrt); k++) { if (k < nct) { // Compute the transformation for the k-th column and // place the k-th diagonal in s[k]. // Compute 2-norm of k-th column without under/overflow. s[k] = 0; for (int i = k; i < m; i++) { s[k] = Maths.Hypot(s[k], A[i][k]); } if (s[k] != 0.0) { if (A[k][k] < 0.0) { s[k] = -s[k]; } for (int i = k; i < m; i++) { A[i][k] /= s[k]; } A[k][k] += 1.0; } s[k] = -s[k]; } for (int j = k + 1; j < n; j++) { if ((k < nct) & (s[k] != 0.0)) { // Apply the transformation. double t = 0; for (int i = k; i < m; i++) { t += A[i][k] * A[i][j]; } t = (-t) / A[k][k]; for (int i = k; i < m; i++) { A[i][j] += t * A[i][k]; } } // Place the k-th row of A into e for the // subsequent calculation of the row transformation. e[j] = A[k][j]; } if (wantu & (k < nct)) { // Place the transformation in U for subsequent back // multiplication. for (int i = k; i < m; i++) { U[i][k] = A[i][k]; } } if (k < nrt) { // Compute the k-th row transformation and place the // k-th super-diagonal in e[k]. // Compute 2-norm without under/overflow. e[k] = 0; for (int i = k + 1; i < n; i++) { e[k] = Maths.Hypot(e[k], e[i]); } if (e[k] != 0.0) { if (e[k + 1] < 0.0) { e[k] = -e[k]; } for (int i = k + 1; i < n; i++) { e[i] /= e[k]; } e[k + 1] += 1.0; } e[k] = -e[k]; if ((k + 1 < m) & (e[k] != 0.0)) { // Apply the transformation. for (int i = k + 1; i < m; i++) { work[i] = 0.0; } for (int j = k + 1; j < n; j++) { for (int i = k + 1; i < m; i++) { work[i] += e[j] * A[i][j]; } } for (int j = k + 1; j < n; j++) { double t = (-e[j]) / e[k + 1]; for (int i = k + 1; i < m; i++) { A[i][j] += t * work[i]; } } } if (wantv) { // Place the transformation in V for subsequent // back multiplication. for (int i = k + 1; i < n; i++) { V[i][k] = e[i]; } } } } // Set up the final bidiagonal matrix or order p. int p = System.Math.Min(n, m + 1); if (nct < n) { s[nct] = A[nct][nct]; } if (m < p) { s[p - 1] = 0.0; } if (nrt + 1 < p) { e[nrt] = A[nrt][p - 1]; } e[p - 1] = 0.0; // If required, generate U. if (wantu) { for (int j = nct; j < nu; j++) { for (int i = 0; i < m; i++) { U[i][j] = 0.0; } U[j][j] = 1.0; } for (int k = nct - 1; k >= 0; k--) { if (s[k] != 0.0) { for (int j = k + 1; j < nu; j++) { double t = 0; for (int i = k; i < m; i++) { t += U[i][k] * U[i][j]; } t = (-t) / U[k][k]; for (int i = k; i < m; i++) { U[i][j] += t * U[i][k]; } } for (int i = k; i < m; i++) { U[i][k] = -U[i][k]; } U[k][k] = 1.0 + U[k][k]; for (int i = 0; i < k - 1; i++) { U[i][k] = 0.0; } } else { for (int i = 0; i < m; i++) { U[i][k] = 0.0; } U[k][k] = 1.0; } } } // If required, generate V. if (wantv) { for (int k = n - 1; k >= 0; k--) { if ((k < nrt) & (e[k] != 0.0)) { for (int j = k + 1; j < nu; j++) { double t = 0; for (int i = k + 1; i < n; i++) { t += V[i][k] * V[i][j]; } t = (-t) / V[k + 1][k]; for (int i = k + 1; i < n; i++) { V[i][j] += t * V[i][k]; } } } for (int i = 0; i < n; i++) { V[i][k] = 0.0; } V[k][k] = 1.0; } } // Main iteration loop for the singular values. int pp = p - 1; int iter = 0; double eps = System.Math.Pow(2.0, -52.0); while (p > 0) { int k, kase; // Here is where a test for too many iterations would go. // This section of the program inspects for // negligible elements in the s and e arrays. On // completion the variables kase and k are set as follows. // kase = 1 if s(p) and e[k-1] are negligible and k<p // kase = 2 if s(k) is negligible and k<p // kase = 3 if e[k-1] is negligible, k<p, and // s(k), ..., s(p) are not negligible (qr step). // kase = 4 if e(p-1) is negligible (convergence). for (k = p - 2; k >= -1; k--) { if (k == -1) { break; } if (System.Math.Abs(e[k]) <= eps * (System.Math.Abs(s[k]) + System.Math.Abs(s[k + 1]))) { e[k] = 0.0; break; } } if (k == p - 2) { kase = 4; } else { int ks; for (ks = p - 1; ks >= k; ks--) { if (ks == k) { break; } double t = (ks != p?System.Math.Abs(e[ks]):0.0) + (ks != k + 1?System.Math.Abs(e[ks - 1]):0.0); if (System.Math.Abs(s[ks]) <= eps * t) { s[ks] = 0.0; break; } } if (ks == k) { kase = 3; } else if (ks == p - 1) { kase = 1; } else { kase = 2; k = ks; } } k++; // Perform the task indicated by kase. switch (kase) { // Deflate negligible s(p). case 1: { double f = e[p - 2]; e[p - 2] = 0.0; for (int j = p - 2; j >= k; j--) { double t = Maths.Hypot(s[j], f); double cs = s[j] / t; double sn = f / t; s[j] = t; if (j != k) { f = (-sn) * e[j - 1]; e[j - 1] = cs * e[j - 1]; } if (wantv) { for (int i = 0; i < n; i++) { t = cs * V[i][j] + sn * V[i][p - 1]; V[i][p - 1] = (-sn) * V[i][j] + cs * V[i][p - 1]; V[i][j] = t; } } } } break; // Split at negligible s(k). case 2: { double f = e[k - 1]; e[k - 1] = 0.0; for (int j = k; j < p; j++) { double t = Maths.Hypot(s[j], f); double cs = s[j] / t; double sn = f / t; s[j] = t; f = (-sn) * e[j]; e[j] = cs * e[j]; if (wantu) { for (int i = 0; i < m; i++) { t = cs * U[i][j] + sn * U[i][k - 1]; U[i][k - 1] = (-sn) * U[i][j] + cs * U[i][k - 1]; U[i][j] = t; } } } } break; // Perform one qr step. case 3: { // Calculate the shift. double scale = System.Math.Max(System.Math.Max(System.Math.Max(System.Math.Max(System.Math.Abs(s[p - 1]), System.Math.Abs(s[p - 2])), System.Math.Abs(e[p - 2])), System.Math.Abs(s[k])), System.Math.Abs(e[k])); double sp = s[p - 1] / scale; double spm1 = s[p - 2] / scale; double epm1 = e[p - 2] / scale; double sk = s[k] / scale; double ek = e[k] / scale; double b = ((spm1 + sp) * (spm1 - sp) + epm1 * epm1) / 2.0; double c = (sp * epm1) * (sp * epm1); double shift = 0.0; if ((b != 0.0) | (c != 0.0)) { shift = System.Math.Sqrt(b * b + c); if (b < 0.0) { shift = -shift; } shift = c / (b + shift); } double f = (sk + sp) * (sk - sp) + shift; double g = sk * ek; // Chase zeros. for (int j = k; j < p - 1; j++) { double t = Maths.Hypot(f, g); double cs = f / t; double sn = g / t; if (j != k) { e[j - 1] = t; } f = cs * s[j] + sn * e[j]; e[j] = cs * e[j] - sn * s[j]; g = sn * s[j + 1]; s[j + 1] = cs * s[j + 1]; if (wantv) { for (int i = 0; i < n; i++) { t = cs * V[i][j] + sn * V[i][j + 1]; V[i][j + 1] = (-sn) * V[i][j] + cs * V[i][j + 1]; V[i][j] = t; } } t = Maths.Hypot(f, g); cs = f / t; sn = g / t; s[j] = t; f = cs * e[j] + sn * s[j + 1]; s[j + 1] = (-sn) * e[j] + cs * s[j + 1]; g = sn * e[j + 1]; e[j + 1] = cs * e[j + 1]; if (wantu && (j < m - 1)) { for (int i = 0; i < m; i++) { t = cs * U[i][j] + sn * U[i][j + 1]; U[i][j + 1] = (-sn) * U[i][j] + cs * U[i][j + 1]; U[i][j] = t; } } } e[p - 2] = f; iter = iter + 1; } break; // Convergence. case 4: { // Make the singular values positive. if (s[k] <= 0.0) { s[k] = (s[k] < 0.0?-s[k]:0.0); if (wantv) { for (int i = 0; i <= pp; i++) { V[i][k] = -V[i][k]; } } } // Order the singular values. while (k < pp) { if (s[k] >= s[k + 1]) { break; } double t = s[k]; s[k] = s[k + 1]; s[k + 1] = t; if (wantv && (k < n - 1)) { for (int i = 0; i < n; i++) { t = V[i][k + 1]; V[i][k + 1] = V[i][k]; V[i][k] = t; } } if (wantu && (k < m - 1)) { for (int i = 0; i < m; i++) { t = U[i][k + 1]; U[i][k + 1] = U[i][k]; U[i][k] = t; } } k++; } iter = 0; p--; } break; } } }
// Symmetric tridiagonal QL algorithm. private void tql2() { // This is derived from the Algol procedures tql2, by // Bowdler, Martin, Reinsch, and Wilkinson, Handbook for // Auto. Comp., Vol.ii-Linear Algebra, and the corresponding // Fortran subroutine in EISPACK. for (int i = 1; i < n; i++) { e[i - 1] = e[i]; } e[n - 1] = 0.0; double f = 0.0; double tst1 = 0.0; double eps = System.Math.Pow(2.0, -52.0); for (int l = 0; l < n; l++) { // Find small subdiagonal element tst1 = System.Math.Max(tst1, System.Math.Abs(d[l]) + System.Math.Abs(e[l])); int m = l; while (m < n) { if (System.Math.Abs(e[m]) <= eps * tst1) { break; } m++; } // If m == l, d[l] is an eigenvalue, // otherwise, iterate. if (m > l) { int iter = 0; do { iter = iter + 1; // (Could check iteration count here.) // Compute implicit shift double g = d[l]; double p = (d[l + 1] - g) / (2.0 * e[l]); double r = Maths.Hypot(p, 1.0); if (p < 0) { r = -r; } d[l] = e[l] / (p + r); d[l + 1] = e[l] * (p + r); double dl1 = d[l + 1]; double h = g - d[l]; for (int i = l + 2; i < n; i++) { d[i] -= h; } f = f + h; // Implicit QL transformation. p = d[m]; double c = 1.0; double c2 = c; double c3 = c; double el1 = e[l + 1]; double s = 0.0; double s2 = 0.0; for (int i = m - 1; i >= l; i--) { c3 = c2; c2 = c; s2 = s; g = c * e[i]; h = c * p; r = Maths.Hypot(p, e[i]); e[i + 1] = s * r; s = e[i] / r; c = p / r; p = c * d[i] - s * g; d[i + 1] = h + s * (c * g + s * d[i]); // Accumulate transformation. for (int k = 0; k < n; k++) { h = V[k][i + 1]; V[k][i + 1] = s * V[k][i] + c * h; V[k][i] = c * V[k][i] - s * h; } } p = (-s) * s2 * c3 * el1 * e[l] / dl1; e[l] = s * p; d[l] = c * p; // Check for convergence. }while (System.Math.Abs(e[l]) > eps * tst1); } d[l] = d[l] + f; e[l] = 0.0; } // Sort eigenvalues and corresponding vectors. for (int i = 0; i < n - 1; i++) { int k = i; double p = d[i]; for (int j = i + 1; j < n; j++) { if (d[j] < p) { k = j; p = d[j]; } } if (k != i) { d[k] = d[i]; d[i] = p; for (int j = 0; j < n; j++) { p = V[j][i]; V[j][i] = V[j][k]; V[j][k] = p; } } } }