= n, the LU decomposition is an m-by-n * unit lower triangular matrix L, an n-by-n upper triangular matrix U, * and a permutation vector piv of length m so that A(piv,:) = L*U. * If m < n, then L is m-by-m and U is m-by-n. * * The LU decompostion with pivoting always exists, even if the matrix is * singular, so the constructor will never fail. The primary use of the * LU decomposition is in the solution of square systems of simultaneous * linear equations. This will fail if isNonsingular() returns false. * * @author Paul Meagher * @author Bartosz Matosiuk * @author Michael Bommarito * @version 1.1 * @license PHP v3.0 */ class PHPExcel_Shared_JAMA_LUDecomposition { const MatrixSingularException = "Can only perform operation on singular matrix."; const MatrixSquareException = "Mismatched Row dimension"; /** * Decomposition storage * @var array */ private $LU = array(); /** * Row dimension. * @var int */ private $m; /** * Column dimension. * @var int */ private $n; /** * Pivot sign. * @var int */ private $pivsign; /** * Internal storage of pivot vector. * @var array */ private $piv = array(); /** * LU Decomposition constructor. * * @param $A Rectangular matrix * @return Structure to access L, U and piv. */ public function __construct($A) { if ($A instanceof PHPExcel_Shared_JAMA_Matrix) { // Use a "left-looking", dot-product, Crout/Doolittle algorithm. $this->LU = $A->getArray(); $this->m = $A->getRowDimension(); $this->n = $A->getColumnDimension(); for ($i = 0; $i < $this->m; ++$i) { $this->piv[$i] = $i; } $this->pivsign = 1; $LUrowi = $LUcolj = array(); // Outer loop. for ($j = 0; $j < $this->n; ++$j) { // Make a copy of the j-th column to localize references. for ($i = 0; $i < $this->m; ++$i) { $LUcolj[$i] = &$this->LU[$i][$j]; } // Apply previous transformations. for ($i = 0; $i < $this->m; ++$i) { $LUrowi = $this->LU[$i]; // Most of the time is spent in the following dot product. $kmax = min($i,$j); $s = 0.0; for ($k = 0; $k < $kmax; ++$k) { $s += $LUrowi[$k] * $LUcolj[$k]; } $LUrowi[$j] = $LUcolj[$i] -= $s; } // Find pivot and exchange if necessary. $p = $j; for ($i = $j+1; $i < $this->m; ++$i) { if (abs($LUcolj[$i]) > abs($LUcolj[$p])) { $p = $i; } } if ($p != $j) { for ($k = 0; $k < $this->n; ++$k) { $t = $this->LU[$p][$k]; $this->LU[$p][$k] = $this->LU[$j][$k]; $this->LU[$j][$k] = $t; } $k = $this->piv[$p]; $this->piv[$p] = $this->piv[$j]; $this->piv[$j] = $k; $this->pivsign = $this->pivsign * -1; } // Compute multipliers. if (($j < $this->m) && ($this->LU[$j][$j] != 0.0)) { for ($i = $j+1; $i < $this->m; ++$i) { $this->LU[$i][$j] /= $this->LU[$j][$j]; } } } } else { throw new Exception(PHPExcel_Shared_JAMA_Matrix::ArgumentTypeException); } } // function __construct() /** * Get lower triangular factor. * * @return array Lower triangular factor */ public function getL() { for ($i = 0; $i < $this->m; ++$i) { for ($j = 0; $j < $this->n; ++$j) { if ($i > $j) { $L[$i][$j] = $this->LU[$i][$j]; } elseif ($i == $j) { $L[$i][$j] = 1.0; } else { $L[$i][$j] = 0.0; } } } return new PHPExcel_Shared_JAMA_Matrix($L); } // function getL() /** * Get upper triangular factor. * * @return array Upper triangular factor */ public function getU() { for ($i = 0; $i < $this->n; ++$i) { for ($j = 0; $j < $this->n; ++$j) { if ($i <= $j) { $U[$i][$j] = $this->LU[$i][$j]; } else { $U[$i][$j] = 0.0; } } } return new PHPExcel_Shared_JAMA_Matrix($U); } // function getU() /** * Return pivot permutation vector. * * @return array Pivot vector */ public function getPivot() { return $this->piv; } // function getPivot() /** * Alias for getPivot * * @see getPivot */ public function getDoublePivot() { return $this->getPivot(); } // function getDoublePivot() /** * Is the matrix nonsingular? * * @return true if U, and hence A, is nonsingular. */ public function isNonsingular() { for ($j = 0; $j < $this->n; ++$j) { if ($this->LU[$j][$j] == 0) { return false; } } return true; } // function isNonsingular() /** * Count determinants * * @return array d matrix deterninat */ public function det() { if ($this->m == $this->n) { $d = $this->pivsign; for ($j = 0; $j < $this->n; ++$j) { $d *= $this->LU[$j][$j]; } return $d; } else { throw new Exception(PHPExcel_Shared_JAMA_Matrix::MatrixDimensionException); } } // function det() /** * Solve A*X = B * * @param $B A Matrix with as many rows as A and any number of columns. * @return X so that L*U*X = B(piv,:) * @exception IllegalArgumentException Matrix row dimensions must agree. * @exception RuntimeException Matrix is singular. */ public function solve($B) { if ($B->getRowDimension() == $this->m) { if ($this->isNonsingular()) { // Copy right hand side with pivoting $nx = $B->getColumnDimension(); $X = $B->getMatrix($this->piv, 0, $nx-1); // Solve L*Y = B(piv,:) for ($k = 0; $k < $this->n; ++$k) { for ($i = $k+1; $i < $this->n; ++$i) { for ($j = 0; $j < $nx; ++$j) { $X->A[$i][$j] -= $X->A[$k][$j] * $this->LU[$i][$k]; } } } // Solve U*X = Y; for ($k = $this->n-1; $k >= 0; --$k) { for ($j = 0; $j < $nx; ++$j) { $X->A[$k][$j] /= $this->LU[$k][$k]; } for ($i = 0; $i < $k; ++$i) { for ($j = 0; $j < $nx; ++$j) { $X->A[$i][$j] -= $X->A[$k][$j] * $this->LU[$i][$k]; } } } return $X; } else { throw new Exception(self::MatrixSingularException); } } else { throw new Exception(self::MatrixSquareException); } } // function solve() } // class PHPExcel_Shared_JAMA_LUDecomposition