[jalview.git] / src / jalview / math / Matrix.java

/*\r
 * Jalview - A Sequence Alignment Editor and Viewer\r
 * Copyright (C) 2007 AM Waterhouse, J Procter, G Barton, M Clamp, S Searle\r
 *\r
 * This program is free software; you can redistribute it and/or\r
 * modify it under the terms of the GNU General Public License\r
 * as published by the Free Software Foundation; either version 2\r
 * of the License, or (at your option) any later version.\r
 *\r
 * This program is distributed in the hope that it will be useful,\r
 * but WITHOUT ANY WARRANTY; without even the implied warranty of\r
 * MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE.  See the\r
 * GNU General Public License for more details.\r
 *\r
 * You should have received a copy of the GNU General Public License\r
 * along with this program; if not, write to the Free Software\r
 * Foundation, Inc., 51 Franklin Street, Fifth Floor, Boston, MA  02110-1301, USA\r
 */\r
package jalview.math;\r
\r
import java.io.*;\r
\r
import jalview.util.*;\r
\r
/**\r
 * DOCUMENT ME!\r
 *\r
 * @author $author$\r
 * @version $Revision$\r
 */\r
public class Matrix\r
{\r
  /**\r
   * SMJSPUBLIC\r
   */\r
  public double[][] value;\r
\r
  /** DOCUMENT ME!! */\r
  public int rows;\r
\r
  /** DOCUMENT ME!! */\r
  public int cols;\r
\r
  /** DOCUMENT ME!! */\r
  public double[] d; // Diagonal\r
\r
  /** DOCUMENT ME!! */\r
  public double[] e; // off diagonal\r
\r
  /**\r
   * Creates a new Matrix object.\r
   *\r
   * @param value DOCUMENT ME!\r
   * @param rows DOCUMENT ME!\r
   * @param cols DOCUMENT ME!\r
   */\r
  public Matrix(double[][] value, int rows, int cols)\r
  {\r
    this.rows = rows;\r
    this.cols = cols;\r
    this.value = value;\r
  }\r
\r
  /**\r
   * DOCUMENT ME!\r
   *\r
   * @return DOCUMENT ME!\r
   */\r
  public Matrix transpose()\r
  {\r
    double[][] out = new double[cols][rows];\r
\r
    for (int i = 0; i < cols; i++)\r
    {\r
      for (int j = 0; j < rows; j++)\r
      {\r
        out[i][j] = value[j][i];\r
      }\r
    }\r
\r
    return new Matrix(out, cols, rows);\r
  }\r
\r
  /**\r
   * DOCUMENT ME!\r
   *\r
   * @param ps DOCUMENT ME!\r
   */\r
  public void print(PrintStream ps)\r
  {\r
    for (int i = 0; i < rows; i++)\r
    {\r
      for (int j = 0; j < cols; j++)\r
      {\r
        Format.print(ps, "%8.2f", value[i][j]);\r
      }\r
\r
      ps.println();\r
    }\r
  }\r
\r
  /**\r
   * DOCUMENT ME!\r
   *\r
   * @param in DOCUMENT ME!\r
   *\r
   * @return DOCUMENT ME!\r
   */\r
  public Matrix preMultiply(Matrix in)\r
  {\r
    double[][] tmp = new double[in.rows][this.cols];\r
\r
    for (int i = 0; i < in.rows; i++)\r
    {\r
      for (int j = 0; j < this.cols; j++)\r
      {\r
        tmp[i][j] = 0.0;\r
\r
        for (int k = 0; k < in.cols; k++)\r
        {\r
          tmp[i][j] += (in.value[i][k] * this.value[k][j]);\r
        }\r
      }\r
    }\r
\r
    return new Matrix(tmp, in.rows, this.cols);\r
  }\r
\r
  /**\r
   * DOCUMENT ME!\r
   *\r
   * @param in DOCUMENT ME!\r
   *\r
   * @return DOCUMENT ME!\r
   */\r
  public double[] vectorPostMultiply(double[] in)\r
  {\r
    double[] out = new double[in.length];\r
\r
    for (int i = 0; i < in.length; i++)\r
    {\r
      out[i] = 0.0;\r
\r
      for (int k = 0; k < in.length; k++)\r
      {\r
        out[i] += (value[i][k] * in[k]);\r
      }\r
    }\r
\r
    return out;\r
  }\r
\r
  /**\r
   * DOCUMENT ME!\r
   *\r
   * @param in DOCUMENT ME!\r
   *\r
   * @return DOCUMENT ME!\r
   */\r
  public Matrix postMultiply(Matrix in)\r
  {\r
    double[][] out = new double[this.rows][in.cols];\r
\r
    for (int i = 0; i < this.rows; i++)\r
    {\r
      for (int j = 0; j < in.cols; j++)\r
      {\r
        out[i][j] = 0.0;\r
\r
        for (int k = 0; k < rows; k++)\r
        {\r
          out[i][j] = out[i][j] + (value[i][k] * in.value[k][j]);\r
        }\r
      }\r
    }\r
\r
    return new Matrix(out, this.cols, in.rows);\r
  }\r
\r
  /**\r
   * DOCUMENT ME!\r
   *\r
   * @return DOCUMENT ME!\r
   */\r
  public Matrix copy()\r
  {\r
    double[][] newmat = new double[rows][cols];\r
\r
    for (int i = 0; i < rows; i++)\r
    {\r
      for (int j = 0; j < cols; j++)\r
      {\r
        newmat[i][j] = value[i][j];\r
      }\r
    }\r
\r
    return new Matrix(newmat, rows, cols);\r
  }\r
\r
  /**\r
   * DOCUMENT ME!\r
   */\r
  public void tred()\r
  {\r
    int n = rows;\r
    int l;\r
    int k;\r
    int j;\r
    int i;\r
\r
    double scale;\r
    double hh;\r
    double h;\r
    double g;\r
    double f;\r
\r
    this.d = new double[rows];\r
    this.e = new double[rows];\r
\r
    for (i = n; i >= 2; i--)\r
    {\r
      l = i - 1;\r
      h = 0.0;\r
      scale = 0.0;\r
\r
      if (l > 1)\r
      {\r
        for (k = 1; k <= l; k++)\r
        {\r
          scale += Math.abs(value[i - 1][k - 1]);\r
        }\r
\r
        if (scale == 0.0)\r
        {\r
          e[i - 1] = value[i - 1][l - 1];\r
        }\r
        else\r
        {\r
          for (k = 1; k <= l; k++)\r
          {\r
            value[i - 1][k - 1] /= scale;\r
            h += (value[i - 1][k - 1] * value[i - 1][k - 1]);\r
          }\r
\r
          f = value[i - 1][l - 1];\r
\r
          if (f > 0)\r
          {\r
            g = -1.0 * Math.sqrt(h);\r
          }\r
          else\r
          {\r
            g = Math.sqrt(h);\r
          }\r
\r
          e[i - 1] = scale * g;\r
          h -= (f * g);\r
          value[i - 1][l - 1] = f - g;\r
          f = 0.0;\r
\r
          for (j = 1; j <= l; j++)\r
          {\r
            value[j - 1][i - 1] = value[i - 1][j - 1] / h;\r
            g = 0.0;\r
\r
            for (k = 1; k <= j; k++)\r
            {\r
              g += (value[j - 1][k - 1] * value[i - 1][k - 1]);\r
            }\r
\r
            for (k = j + 1; k <= l; k++)\r
            {\r
              g += (value[k - 1][j - 1] * value[i - 1][k - 1]);\r
            }\r
\r
            e[j - 1] = g / h;\r
            f += (e[j - 1] * value[i - 1][j - 1]);\r
          }\r
\r
          hh = f / (h + h);\r
\r
          for (j = 1; j <= l; j++)\r
          {\r
            f = value[i - 1][j - 1];\r
            g = e[j - 1] - (hh * f);\r
            e[j - 1] = g;\r
\r
            for (k = 1; k <= j; k++)\r
            {\r
              value[j - 1][k - 1] -= ( (f * e[k - 1]) +\r
                                      (g * value[i - 1][k - 1]));\r
            }\r
          }\r
        }\r
      }\r
      else\r
      {\r
        e[i - 1] = value[i - 1][l - 1];\r
      }\r
\r
      d[i - 1] = h;\r
    }\r
\r
    d[0] = 0.0;\r
    e[0] = 0.0;\r
\r
    for (i = 1; i <= n; i++)\r
    {\r
      l = i - 1;\r
\r
      if (d[i - 1] != 0.0)\r
      {\r
        for (j = 1; j <= l; j++)\r
        {\r
          g = 0.0;\r
\r
          for (k = 1; k <= l; k++)\r
          {\r
            g += (value[i - 1][k - 1] * value[k - 1][j - 1]);\r
          }\r
\r
          for (k = 1; k <= l; k++)\r
          {\r
            value[k - 1][j - 1] -= (g * value[k - 1][i - 1]);\r
          }\r
        }\r
      }\r
\r
      d[i - 1] = value[i - 1][i - 1];\r
      value[i - 1][i - 1] = 1.0;\r
\r
      for (j = 1; j <= l; j++)\r
      {\r
        value[j - 1][i - 1] = 0.0;\r
        value[i - 1][j - 1] = 0.0;\r
      }\r
    }\r
  }\r
\r
  /**\r
   * DOCUMENT ME!\r
   */\r
  public void tqli()\r
  {\r
    int n = rows;\r
\r
    int m;\r
    int l;\r
    int iter;\r
    int i;\r
    int k;\r
    double s;\r
    double r;\r
    double p;\r
    ;\r
\r
    double g;\r
    double f;\r
    double dd;\r
    double c;\r
    double b;\r
\r
    for (i = 2; i <= n; i++)\r
    {\r
      e[i - 2] = e[i - 1];\r
    }\r
\r
    e[n - 1] = 0.0;\r
\r
    for (l = 1; l <= n; l++)\r
    {\r
      iter = 0;\r
\r
      do\r
      {\r
        for (m = l; m <= (n - 1); m++)\r
        {\r
          dd = Math.abs(d[m - 1]) + Math.abs(d[m]);\r
\r
          if ( (Math.abs(e[m - 1]) + dd) == dd)\r
          {\r
            break;\r
          }\r
        }\r
\r
        if (m != l)\r
        {\r
          iter++;\r
\r
          if (iter == 30)\r
          {\r
            System.err.print("Too many iterations in tqli");\r
            System.exit(0); // JBPNote - should this really be here ???\r
          }\r
          else\r
          {\r
            //      System.out.println("Iteration " + iter);\r
          }\r
\r
          g = (d[l] - d[l - 1]) / (2.0 * e[l - 1]);\r
          r = Math.sqrt( (g * g) + 1.0);\r
          g = d[m - 1] - d[l - 1] + (e[l - 1] / (g + sign(r, g)));\r
          c = 1.0;\r
          s = c;\r
          p = 0.0;\r
\r
          for (i = m - 1; i >= l; i--)\r
          {\r
            f = s * e[i - 1];\r
            b = c * e[i - 1];\r
\r
            if (Math.abs(f) >= Math.abs(g))\r
            {\r
              c = g / f;\r
              r = Math.sqrt( (c * c) + 1.0);\r
              e[i] = f * r;\r
              s = 1.0 / r;\r
              c *= s;\r
            }\r
            else\r
            {\r
              s = f / g;\r
              r = Math.sqrt( (s * s) + 1.0);\r
              e[i] = g * r;\r
              c = 1.0 / r;\r
              s *= c;\r
            }\r
\r
            g = d[i] - p;\r
            r = ( (d[i - 1] - g) * s) + (2.0 * c * b);\r
            p = s * r;\r
            d[i] = g + p;\r
            g = (c * r) - b;\r
\r
            for (k = 1; k <= n; k++)\r
            {\r
              f = value[k - 1][i];\r
              value[k - 1][i] = (s * value[k - 1][i - 1]) +\r
                  (c * f);\r
              value[k - 1][i - 1] = (c * value[k - 1][i - 1]) -\r
                  (s * f);\r
            }\r
          }\r
\r
          d[l - 1] = d[l - 1] - p;\r
          e[l - 1] = g;\r
          e[m - 1] = 0.0;\r
        }\r
      }\r
      while (m != l);\r
    }\r
  }\r
\r
  /**\r
   * DOCUMENT ME!\r
   */\r
  public void tred2()\r
  {\r
    int n = rows;\r
    int l;\r
    int k;\r
    int j;\r
    int i;\r
\r
    double scale;\r
    double hh;\r
    double h;\r
    double g;\r
    double f;\r
\r
    this.d = new double[rows];\r
    this.e = new double[rows];\r
\r
    for (i = n - 1; i >= 1; i--)\r
    {\r
      l = i - 1;\r
      h = 0.0;\r
      scale = 0.0;\r
\r
      if (l > 0)\r
      {\r
        for (k = 0; k < l; k++)\r
        {\r
          scale += Math.abs(value[i][k]);\r
        }\r
\r
        if (scale == 0.0)\r
        {\r
          e[i] = value[i][l];\r
        }\r
        else\r
        {\r
          for (k = 0; k < l; k++)\r
          {\r
            value[i][k] /= scale;\r
            h += (value[i][k] * value[i][k]);\r
          }\r
\r
          f = value[i][l];\r
\r
          if (f > 0)\r
          {\r
            g = -1.0 * Math.sqrt(h);\r
          }\r
          else\r
          {\r
            g = Math.sqrt(h);\r
          }\r
\r
          e[i] = scale * g;\r
          h -= (f * g);\r
          value[i][l] = f - g;\r
          f = 0.0;\r
\r
          for (j = 0; j < l; j++)\r
          {\r
            value[j][i] = value[i][j] / h;\r
            g = 0.0;\r
\r
            for (k = 0; k < j; k++)\r
            {\r
              g += (value[j][k] * value[i][k]);\r
            }\r
\r
            for (k = j; k < l; k++)\r
            {\r
              g += (value[k][j] * value[i][k]);\r
            }\r
\r
            e[j] = g / h;\r
            f += (e[j] * value[i][j]);\r
          }\r
\r
          hh = f / (h + h);\r
\r
          for (j = 0; j < l; j++)\r
          {\r
            f = value[i][j];\r
            g = e[j] - (hh * f);\r
            e[j] = g;\r
\r
            for (k = 0; k < j; k++)\r
            {\r
              value[j][k] -= ( (f * e[k]) + (g * value[i][k]));\r
            }\r
          }\r
        }\r
      }\r
      else\r
      {\r
        e[i] = value[i][l];\r
      }\r
\r
      d[i] = h;\r
    }\r
\r
    d[0] = 0.0;\r
    e[0] = 0.0;\r
\r
    for (i = 0; i < n; i++)\r
    {\r
      l = i - 1;\r
\r
      if (d[i] != 0.0)\r
      {\r
        for (j = 0; j < l; j++)\r
        {\r
          g = 0.0;\r
\r
          for (k = 0; k < l; k++)\r
          {\r
            g += (value[i][k] * value[k][j]);\r
          }\r
\r
          for (k = 0; k < l; k++)\r
          {\r
            value[k][j] -= (g * value[k][i]);\r
          }\r
        }\r
      }\r
\r
      d[i] = value[i][i];\r
      value[i][i] = 1.0;\r
\r
      for (j = 0; j < l; j++)\r
      {\r
        value[j][i] = 0.0;\r
        value[i][j] = 0.0;\r
      }\r
    }\r
  }\r
\r
  /**\r
   * DOCUMENT ME!\r
   */\r
  public void tqli2()\r
  {\r
    int n = rows;\r
\r
    int m;\r
    int l;\r
    int iter;\r
    int i;\r
    int k;\r
    double s;\r
    double r;\r
    double p;\r
    ;\r
\r
    double g;\r
    double f;\r
    double dd;\r
    double c;\r
    double b;\r
\r
    for (i = 2; i <= n; i++)\r
    {\r
      e[i - 2] = e[i - 1];\r
    }\r
\r
    e[n - 1] = 0.0;\r
\r
    for (l = 1; l <= n; l++)\r
    {\r
      iter = 0;\r
\r
      do\r
      {\r
        for (m = l; m <= (n - 1); m++)\r
        {\r
          dd = Math.abs(d[m - 1]) + Math.abs(d[m]);\r
\r
          if ( (Math.abs(e[m - 1]) + dd) == dd)\r
          {\r
            break;\r
          }\r
        }\r
\r
        if (m != l)\r
        {\r
          iter++;\r
\r
          if (iter == 30)\r
          {\r
            System.err.print("Too many iterations in tqli");\r
            System.exit(0); // JBPNote - same as above - not a graceful exit!\r
          }\r
          else\r
          {\r
            //      System.out.println("Iteration " + iter);\r
          }\r
\r
          g = (d[l] - d[l - 1]) / (2.0 * e[l - 1]);\r
          r = Math.sqrt( (g * g) + 1.0);\r
          g = d[m - 1] - d[l - 1] + (e[l - 1] / (g + sign(r, g)));\r
          c = 1.0;\r
          s = c;\r
          p = 0.0;\r
\r
          for (i = m - 1; i >= l; i--)\r
          {\r
            f = s * e[i - 1];\r
            b = c * e[i - 1];\r
\r
            if (Math.abs(f) >= Math.abs(g))\r
            {\r
              c = g / f;\r
              r = Math.sqrt( (c * c) + 1.0);\r
              e[i] = f * r;\r
              s = 1.0 / r;\r
              c *= s;\r
            }\r
            else\r
            {\r
              s = f / g;\r
              r = Math.sqrt( (s * s) + 1.0);\r
              e[i] = g * r;\r
              c = 1.0 / r;\r
              s *= c;\r
            }\r
\r
            g = d[i] - p;\r
            r = ( (d[i - 1] - g) * s) + (2.0 * c * b);\r
            p = s * r;\r
            d[i] = g + p;\r
            g = (c * r) - b;\r
\r
            for (k = 1; k <= n; k++)\r
            {\r
              f = value[k - 1][i];\r
              value[k - 1][i] = (s * value[k - 1][i - 1]) +\r
                  (c * f);\r
              value[k - 1][i - 1] = (c * value[k - 1][i - 1]) -\r
                  (s * f);\r
            }\r
          }\r
\r
          d[l - 1] = d[l - 1] - p;\r
          e[l - 1] = g;\r
          e[m - 1] = 0.0;\r
        }\r
      }\r
      while (m != l);\r
    }\r
  }\r
\r
  /**\r
   * DOCUMENT ME!\r
   *\r
   * @param a DOCUMENT ME!\r
   * @param b DOCUMENT ME!\r
   *\r
   * @return DOCUMENT ME!\r
   */\r
  public double sign(double a, double b)\r
  {\r
    if (b < 0)\r
    {\r
      return -Math.abs(a);\r
    }\r
    else\r
    {\r
      return Math.abs(a);\r
    }\r
  }\r
\r
  /**\r
   * DOCUMENT ME!\r
   *\r
   * @param n DOCUMENT ME!\r
   *\r
   * @return DOCUMENT ME!\r
   */\r
  public double[] getColumn(int n)\r
  {\r
    double[] out = new double[rows];\r
\r
    for (int i = 0; i < rows; i++)\r
    {\r
      out[i] = value[i][n];\r
    }\r
\r
    return out;\r
  }\r
\r
  /**\r
   * DOCUMENT ME!\r
   *\r
   * @param ps DOCUMENT ME!\r
   */\r
  public void printD(PrintStream ps)\r
  {\r
    for (int j = 0; j < rows; j++)\r
    {\r
      Format.print(ps, "%15.4e", d[j]);\r
    }\r
  }\r
\r
  /**\r
   * DOCUMENT ME!\r
   *\r
   * @param ps DOCUMENT ME!\r
   */\r
  public void printE(PrintStream ps)\r
  {\r
    for (int j = 0; j < rows; j++)\r
    {\r
      Format.print(ps, "%15.4e", e[j]);\r
    }\r
  }\r
\r
  /**\r
   * DOCUMENT ME!\r
   *\r
   * @param args DOCUMENT ME!\r
   */\r
  public static void main(String[] args)\r
  {\r
    int n = Integer.parseInt(args[0]);\r
    double[][] in = new double[n][n];\r
\r
    for (int i = 0; i < n; i++)\r
    {\r
      for (int j = 0; j < n; j++)\r
      {\r
        in[i][j] = (double) Math.random();\r
      }\r
    }\r
\r
    Matrix origmat = new Matrix(in, n, n);\r
\r
    //    System.out.println(" --- Original matrix ---- ");\r
    ///    origmat.print(System.out);\r
    //System.out.println();\r
    //System.out.println(" --- transpose matrix ---- ");\r
    Matrix trans = origmat.transpose();\r
\r
    //trans.print(System.out);\r
    //System.out.println();\r
    //System.out.println(" --- OrigT * Orig ---- ");\r
    Matrix symm = trans.postMultiply(origmat);\r
\r
    //symm.print(System.out);\r
    //System.out.println();\r
    // Copy the symmetric matrix for later\r
    //Matrix origsymm = symm.copy();\r
\r
    // This produces the tridiagonal transformation matrix\r
    //long tstart = System.currentTimeMillis();\r
    symm.tred();\r
\r
    //long tend = System.currentTimeMillis();\r
\r
    //System.out.println("Time take for tred = " + (tend-tstart) + "ms");\r
    //System.out.println(" ---Tridiag transform matrix ---");\r
    //symm.print(System.out);\r
    //System.out.println();\r
    //System.out.println(" --- D vector ---");\r
    //symm.printD(System.out);\r
    //System.out.println();\r
    //System.out.println(" --- E vector ---");\r
    //symm.printE(System.out);\r
    //System.out.println();\r
    // Now produce the diagonalization matrix\r
    //tstart = System.currentTimeMillis();\r
    symm.tqli();\r
    //tend = System.currentTimeMillis();\r
\r
    //System.out.println("Time take for tqli = " + (tend-tstart) + " ms");\r
    //System.out.println(" --- New diagonalization matrix ---");\r
    //symm.print(System.out);\r
    //System.out.println();\r
    //System.out.println(" --- D vector ---");\r
    //symm.printD(System.out);\r
    //System.out.println();\r
    //System.out.println(" --- E vector ---");\r
    //symm.printE(System.out);\r
    //System.out.println();\r
    //System.out.println(" --- First eigenvector --- ");\r
    //double[] eigenv = symm.getColumn(0);\r
    //for (int i=0; i < eigenv.length;i++) {\r
    //  Format.print(System.out,"%15.4f",eigenv[i]);\r
    // }\r
    //System.out.println();\r
    //double[] neigenv = origsymm.vectorPostMultiply(eigenv);\r
    //for (int i=0; i < neigenv.length;i++) {\r
    //  Format.print(System.out,"%15.4f",neigenv[i]/symm.d[0]);\r
    //}\r
    //System.out.println();\r
  }\r
}\r