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150 lines
4.4 KiB
C++
150 lines
4.4 KiB
C++
// This file is part of Eigen, a lightweight C++ template library
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// for linear algebra.
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//
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// Copyright (C) 2011 Gael Guennebaud <gael.guennebaud@inria.fr>
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//
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// This Source Code Form is subject to the terms of the Mozilla
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// Public License v. 2.0. If a copy of the MPL was not distributed
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// with this file, You can obtain one at http://mozilla.org/MPL/2.0/.
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#ifndef EIGEN_BASIC_PRECONDITIONERS_H
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#define EIGEN_BASIC_PRECONDITIONERS_H
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namespace Eigen {
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/** \ingroup IterativeLinearSolvers_Module
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* \brief A preconditioner based on the digonal entries
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*
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* This class allows to approximately solve for A.x = b problems assuming A is a diagonal matrix.
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* In other words, this preconditioner neglects all off diagonal entries and, in Eigen's language, solves for:
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* \code
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* A.diagonal().asDiagonal() . x = b
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* \endcode
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*
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* \tparam _Scalar the type of the scalar.
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*
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* This preconditioner is suitable for both selfadjoint and general problems.
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* The diagonal entries are pre-inverted and stored into a dense vector.
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*
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* \note A variant that has yet to be implemented would attempt to preserve the norm of each column.
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*
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*/
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template <typename _Scalar>
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class DiagonalPreconditioner
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{
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typedef _Scalar Scalar;
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typedef Matrix<Scalar,Dynamic,1> Vector;
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typedef typename Vector::Index Index;
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public:
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// this typedef is only to export the scalar type and compile-time dimensions to solve_retval
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typedef Matrix<Scalar,Dynamic,Dynamic> MatrixType;
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DiagonalPreconditioner() : m_isInitialized(false) {}
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template<typename MatType>
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DiagonalPreconditioner(const MatType& mat) : m_invdiag(mat.cols())
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{
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compute(mat);
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}
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Index rows() const { return m_invdiag.size(); }
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Index cols() const { return m_invdiag.size(); }
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template<typename MatType>
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DiagonalPreconditioner& analyzePattern(const MatType& )
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{
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return *this;
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}
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template<typename MatType>
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DiagonalPreconditioner& factorize(const MatType& mat)
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{
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m_invdiag.resize(mat.cols());
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for(int j=0; j<mat.outerSize(); ++j)
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{
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typename MatType::InnerIterator it(mat,j);
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while(it && it.index()!=j) ++it;
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if(it && it.index()==j && it.value()!=Scalar(0))
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m_invdiag(j) = Scalar(1)/it.value();
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else
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m_invdiag(j) = Scalar(1);
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}
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m_isInitialized = true;
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return *this;
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}
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template<typename MatType>
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DiagonalPreconditioner& compute(const MatType& mat)
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{
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return factorize(mat);
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}
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template<typename Rhs, typename Dest>
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void _solve(const Rhs& b, Dest& x) const
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{
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x = m_invdiag.array() * b.array() ;
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}
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template<typename Rhs> inline const internal::solve_retval<DiagonalPreconditioner, Rhs>
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solve(const MatrixBase<Rhs>& b) const
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{
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eigen_assert(m_isInitialized && "DiagonalPreconditioner is not initialized.");
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eigen_assert(m_invdiag.size()==b.rows()
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&& "DiagonalPreconditioner::solve(): invalid number of rows of the right hand side matrix b");
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return internal::solve_retval<DiagonalPreconditioner, Rhs>(*this, b.derived());
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}
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protected:
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Vector m_invdiag;
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bool m_isInitialized;
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};
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namespace internal {
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template<typename _MatrixType, typename Rhs>
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struct solve_retval<DiagonalPreconditioner<_MatrixType>, Rhs>
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: solve_retval_base<DiagonalPreconditioner<_MatrixType>, Rhs>
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{
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typedef DiagonalPreconditioner<_MatrixType> Dec;
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EIGEN_MAKE_SOLVE_HELPERS(Dec,Rhs)
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template<typename Dest> void evalTo(Dest& dst) const
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{
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dec()._solve(rhs(),dst);
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}
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};
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}
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/** \ingroup IterativeLinearSolvers_Module
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* \brief A naive preconditioner which approximates any matrix as the identity matrix
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*
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* \sa class DiagonalPreconditioner
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*/
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class IdentityPreconditioner
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{
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public:
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IdentityPreconditioner() {}
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template<typename MatrixType>
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IdentityPreconditioner(const MatrixType& ) {}
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template<typename MatrixType>
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IdentityPreconditioner& analyzePattern(const MatrixType& ) { return *this; }
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template<typename MatrixType>
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IdentityPreconditioner& factorize(const MatrixType& ) { return *this; }
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template<typename MatrixType>
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IdentityPreconditioner& compute(const MatrixType& ) { return *this; }
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template<typename Rhs>
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inline const Rhs& solve(const Rhs& b) const { return b; }
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};
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} // end namespace Eigen
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#endif // EIGEN_BASIC_PRECONDITIONERS_H
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