177 lines
5.3 KiB
C++
177 lines
5.3 KiB
C++
/* -*- C++ -*- ------------------------------------------------------------
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Copyright (c) 2007 Jesse Anders and Demian Nave http://cmldev.net/
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The Configurable Math Library (CML) is distributed under the terms of the
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Boost Software License, v1.0 (see cml/LICENSE for details).
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*-----------------------------------------------------------------------*/
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/** @file
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* @brief Implements LU decomposition for square matrix expressions.
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*
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* @todo The LU implementation does not check for a zero diagonal entry
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* (implying that the input has no LU factorization).
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*
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* @todo Should also have a pivoting implementation.
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*
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* @todo need to throw a numeric error if the determinant of the matrix
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* given to lu(), lu_solve(), or inverse() is 0.
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*
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* @internal The implementation is the same for fixed- and dynamic-size
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* matrices. It can be sped up for small matrices later.
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*/
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#ifndef lu_h
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#define lu_h
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#include <cml/et/size_checking.h>
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#include <cml/matrix/matrix_expr.h>
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#include <cml/matvec/matvec_promotions.h>
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/* This is used below to create a more meaningful compile-time error when
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* lu is not provided with a matrix or MatrixExpr argument:
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*/
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struct lu_expects_a_matrix_arg_error;
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/* This is used below to create a more meaningful compile-time error when
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* lu_inplace is not provided with an assignable matrix argument:
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*/
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struct lu_inplace_expects_an_assignable_matrix_arg_error;
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namespace cml {
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namespace detail {
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/* Compute the LU decomposition in-place: */
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template<class MatT> inline
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void lu_inplace(MatT& A)
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{
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/* Shorthand: */
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typedef et::ExprTraits<MatT> arg_traits;
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typedef typename arg_traits::result_tag arg_result;
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typedef typename arg_traits::assignable_tag arg_assignment;
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typedef typename arg_traits::size_tag size_tag;
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typedef typename arg_traits::value_type value_type;
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/* lu_inplace() requires an assignable matrix expression: */
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CML_STATIC_REQUIRE_M(
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(same_type<arg_result, et::matrix_result_tag>::is_true
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&& same_type<arg_assignment, et::assignable_tag>::is_true),
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lu_inplace_expects_an_assignable_matrix_arg_error);
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/* Note: parens are required here so that the preprocessor ignores the
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* commas.
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*/
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/* Verify that the matrix is square, and get the size: */
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ssize_t N = (ssize_t) cml::et::CheckedSquare(A, size_tag());
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for(ssize_t k = 0; k < N-1; ++k) {
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/* XXX Should check if A(k,k) = 0! */
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for(ssize_t i = k+1; i < N; ++i) {
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value_type n = (A(i,k) /= A(k,k));
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for(ssize_t j = k+1; j < N; ++ j) {
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A(i,j) -= n*A(k,j);
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}
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}
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}
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}
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/* Compute the LU decomposition, and return a copy of the result: */
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template<class MatT>
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inline typename MatT::temporary_type
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lu_copy(const MatT& M)
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{
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/* Shorthand: */
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typedef et::ExprTraits<MatT> arg_traits;
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typedef typename arg_traits::result_tag arg_result;
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/* lu_with_copy() requires a matrix expression: */
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CML_STATIC_REQUIRE_M(
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(same_type<arg_result, et::matrix_result_tag>::is_true),
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lu_expects_a_matrix_arg_error);
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/* Note: parens are required here so that the preprocessor ignores the
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* commas.
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*/
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/* Use the in-place LU function, and return the result: */
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typename MatT::temporary_type A;
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cml::et::detail::Resize(A,M.rows(),M.cols());
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A = M;
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lu_inplace(A);
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return A;
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}
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} // namespace detail
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/** LU factorization for a matrix. */
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template<typename E, class AT, typename BO, class L>
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inline typename matrix<E,AT,BO,L>::temporary_type
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lu(const matrix<E,AT,BO,L>& m)
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{
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return detail::lu_copy(m);
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}
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/** LU factorization for a matrix expression. */
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template<typename XprT>
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inline typename et::MatrixXpr<XprT>::temporary_type
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lu(const et::MatrixXpr<XprT>& e)
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{
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return detail::lu_copy(e);
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}
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/** Solve y = LUx for x.
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*
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* This solves Lb = y for b by forward substitution, then Ux = b for x by
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* backward substitution.
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*/
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template<typename MatT, typename VecT> inline
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typename et::MatVecPromote<MatT,VecT>::temporary_type
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lu_solve(const MatT& LU, const VecT& b)
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{
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/* Shorthand. */
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typedef et::ExprTraits<MatT> lu_traits;
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typedef typename et::MatVecPromote<MatT,VecT>::temporary_type vector_type;
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typedef typename vector_type::value_type value_type;
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/* Verify that the matrix is square, and get the size: */
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ssize_t N = (ssize_t) cml::et::CheckedSquare(
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LU, typename lu_traits::size_tag());
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/* Verify that the matrix and vector have compatible sizes: */
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et::CheckedSize(LU, b, typename vector_type::size_tag());
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/* Solve Ly = b for y by forward substitution. The entries below the
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* diagonal of LU correspond to L, understood to be below a diagonal of
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* 1's:
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*/
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vector_type y; cml::et::detail::Resize(y,N);
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for(ssize_t i = 0; i < N; ++i) {
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y[i] = b[i];
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for(ssize_t j = 0; j < i; ++j) {
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y[i] -= LU(i,j)*y[j];
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}
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}
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/* Solve Ux = y for x by backward substitution. The entries at and above
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* the diagonal of LU correspond to U:
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*/
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vector_type x; cml::et::detail::Resize(x,N);
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for(ssize_t i = N-1; i >= 0; --i) {
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x[i] = y[i];
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for(ssize_t j = i+1; j < N; ++j) {
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x[i] -= LU(i,j)*x[j];
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}
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x[i] /= LU(i,i);
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}
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/* Return x: */
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return x;
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}
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} // namespace cml
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#endif
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// -------------------------------------------------------------------------
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// vim:ft=cpp
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