// This file is part of Eigen, a lightweight C++ template library // for linear algebra. // // Copyright (C) 2010-2011 Gael Guennebaud // // This Source Code Form is subject to the terms of the Mozilla // Public License v. 2.0. If a copy of the MPL was not distributed // with this file, You can obtain one at http://mozilla.org/MPL/2.0/. #ifndef EIGEN_TRANSPOSITIONS_H #define EIGEN_TRANSPOSITIONS_H // IWYU pragma: private #include "./InternalHeaderCheck.h" namespace Eigen { template class TranspositionsBase { typedef internal::traits Traits; public: typedef typename Traits::IndicesType IndicesType; typedef typename IndicesType::Scalar StorageIndex; typedef Eigen::Index Index; ///< \deprecated since Eigen 3.3 EIGEN_DEVICE_FUNC Derived& derived() { return *static_cast(this); } EIGEN_DEVICE_FUNC const Derived& derived() const { return *static_cast(this); } /** Copies the \a other transpositions into \c *this */ template Derived& operator=(const TranspositionsBase& other) { indices() = other.indices(); return derived(); } /** \returns the number of transpositions */ EIGEN_DEVICE_FUNC Index size() const { return indices().size(); } /** \returns the number of rows of the equivalent permutation matrix */ EIGEN_DEVICE_FUNC Index rows() const { return indices().size(); } /** \returns the number of columns of the equivalent permutation matrix */ EIGEN_DEVICE_FUNC Index cols() const { return indices().size(); } /** Direct access to the underlying index vector */ EIGEN_DEVICE_FUNC inline const StorageIndex& coeff(Index i) const { return indices().coeff(i); } /** Direct access to the underlying index vector */ inline StorageIndex& coeffRef(Index i) { return indices().coeffRef(i); } /** Direct access to the underlying index vector */ inline const StorageIndex& operator()(Index i) const { return indices()(i); } /** Direct access to the underlying index vector */ inline StorageIndex& operator()(Index i) { return indices()(i); } /** Direct access to the underlying index vector */ inline const StorageIndex& operator[](Index i) const { return indices()(i); } /** Direct access to the underlying index vector */ inline StorageIndex& operator[](Index i) { return indices()(i); } /** const version of indices(). */ EIGEN_DEVICE_FUNC const IndicesType& indices() const { return derived().indices(); } /** \returns a reference to the stored array representing the transpositions. */ EIGEN_DEVICE_FUNC IndicesType& indices() { return derived().indices(); } /** Resizes to given size. */ inline void resize(Index newSize) { indices().resize(newSize); } /** Sets \c *this to represents an identity transformation */ void setIdentity() { for (StorageIndex i = 0; i < indices().size(); ++i) coeffRef(i) = i; } // FIXME: do we want such methods ? // might be useful when the target matrix expression is complex, e.g.: // object.matrix().block(..,..,..,..) = trans * object.matrix().block(..,..,..,..); /* template void applyForwardToRows(MatrixType& mat) const { for(Index k=0 ; k void applyBackwardToRows(MatrixType& mat) const { for(Index k=size()-1 ; k>=0 ; --k) if(m_indices(k)!=k) mat.row(k).swap(mat.row(m_indices(k))); } */ /** \returns the inverse transformation */ inline Transpose inverse() const { return Transpose(derived()); } /** \returns the transpose transformation */ inline Transpose transpose() const { return Transpose(derived()); } protected: }; namespace internal { template struct traits > : traits > { typedef Matrix IndicesType; typedef TranspositionsStorage StorageKind; }; } // namespace internal /** \class Transpositions * \ingroup Core_Module * * \brief Represents a sequence of transpositions (row/column interchange) * * \tparam SizeAtCompileTime the number of transpositions, or Dynamic * \tparam MaxSizeAtCompileTime the maximum number of transpositions, or Dynamic. This optional parameter defaults to * SizeAtCompileTime. Most of the time, you should not have to specify it. * * This class represents a permutation transformation as a sequence of \em n transpositions * \f$[T_{n-1} \ldots T_{i} \ldots T_{0}]\f$. It is internally stored as a vector of integers \c indices. * Each transposition \f$ T_{i} \f$ applied on the left of a matrix (\f$ T_{i} M\f$) interchanges * the rows \c i and \c indices[i] of the matrix \c M. * A transposition applied on the right (e.g., \f$ M T_{i}\f$) yields a column interchange. * * Compared to the class PermutationMatrix, such a sequence of transpositions is what is * computed during a decomposition with pivoting, and it is faster when applying the permutation in-place. * * To apply a sequence of transpositions to a matrix, simply use the operator * as in the following example: * \code * Transpositions tr; * MatrixXf mat; * mat = tr * mat; * \endcode * In this example, we detect that the matrix appears on both side, and so the transpositions * are applied in-place without any temporary or extra copy. * * \sa class PermutationMatrix */ template class Transpositions : public TranspositionsBase > { typedef internal::traits Traits; public: typedef TranspositionsBase Base; typedef typename Traits::IndicesType IndicesType; typedef typename IndicesType::Scalar StorageIndex; inline Transpositions() {} /** Copy constructor. */ template inline Transpositions(const TranspositionsBase& other) : m_indices(other.indices()) {} /** Generic constructor from expression of the transposition indices. */ template explicit inline Transpositions(const MatrixBase& indices) : m_indices(indices) {} /** Copies the \a other transpositions into \c *this */ template Transpositions& operator=(const TranspositionsBase& other) { return Base::operator=(other); } /** Constructs an uninitialized permutation matrix of given size. */ inline Transpositions(Index size) : m_indices(size) {} /** const version of indices(). */ EIGEN_DEVICE_FUNC const IndicesType& indices() const { return m_indices; } /** \returns a reference to the stored array representing the transpositions. */ EIGEN_DEVICE_FUNC IndicesType& indices() { return m_indices; } protected: IndicesType m_indices; }; namespace internal { template struct traits, PacketAccess_> > : traits > { typedef Map, PacketAccess_> IndicesType; typedef StorageIndex_ StorageIndex; typedef TranspositionsStorage StorageKind; }; } // namespace internal template class Map, PacketAccess> : public TranspositionsBase< Map, PacketAccess> > { typedef internal::traits Traits; public: typedef TranspositionsBase Base; typedef typename Traits::IndicesType IndicesType; typedef typename IndicesType::Scalar StorageIndex; explicit inline Map(const StorageIndex* indicesPtr) : m_indices(indicesPtr) {} inline Map(const StorageIndex* indicesPtr, Index size) : m_indices(indicesPtr, size) {} /** Copies the \a other transpositions into \c *this */ template Map& operator=(const TranspositionsBase& other) { return Base::operator=(other); } #ifndef EIGEN_PARSED_BY_DOXYGEN /** This is a special case of the templated operator=. Its purpose is to * prevent a default operator= from hiding the templated operator=. */ Map& operator=(const Map& other) { m_indices = other.m_indices; return *this; } #endif /** const version of indices(). */ EIGEN_DEVICE_FUNC const IndicesType& indices() const { return m_indices; } /** \returns a reference to the stored array representing the transpositions. */ EIGEN_DEVICE_FUNC IndicesType& indices() { return m_indices; } protected: IndicesType m_indices; }; namespace internal { template struct traits > : traits > { typedef TranspositionsStorage StorageKind; }; } // namespace internal template class TranspositionsWrapper : public TranspositionsBase > { typedef internal::traits Traits; public: typedef TranspositionsBase Base; typedef typename Traits::IndicesType IndicesType; typedef typename IndicesType::Scalar StorageIndex; explicit inline TranspositionsWrapper(IndicesType& indices) : m_indices(indices) {} /** Copies the \a other transpositions into \c *this */ template TranspositionsWrapper& operator=(const TranspositionsBase& other) { return Base::operator=(other); } /** const version of indices(). */ EIGEN_DEVICE_FUNC const IndicesType& indices() const { return m_indices; } /** \returns a reference to the stored array representing the transpositions. */ EIGEN_DEVICE_FUNC IndicesType& indices() { return m_indices; } protected: typename IndicesType::Nested m_indices; }; /** \returns the \a matrix with the \a transpositions applied to the columns. */ template EIGEN_DEVICE_FUNC const Product operator*( const MatrixBase& matrix, const TranspositionsBase& transpositions) { return Product(matrix.derived(), transpositions.derived()); } /** \returns the \a matrix with the \a transpositions applied to the rows. */ template EIGEN_DEVICE_FUNC const Product operator*( const TranspositionsBase& transpositions, const MatrixBase& matrix) { return Product(transpositions.derived(), matrix.derived()); } // Template partial specialization for transposed/inverse transpositions namespace internal { template struct traits > > : traits {}; } // end namespace internal template class Transpose > { typedef TranspositionsDerived TranspositionType; typedef typename TranspositionType::IndicesType IndicesType; public: explicit Transpose(const TranspositionType& t) : m_transpositions(t) {} EIGEN_DEVICE_FUNC constexpr Index size() const noexcept { return m_transpositions.size(); } EIGEN_DEVICE_FUNC constexpr Index rows() const noexcept { return m_transpositions.size(); } EIGEN_DEVICE_FUNC constexpr Index cols() const noexcept { return m_transpositions.size(); } /** \returns the \a matrix with the inverse transpositions applied to the columns. */ template friend const Product operator*(const MatrixBase& matrix, const Transpose& trt) { return Product(matrix.derived(), trt); } /** \returns the \a matrix with the inverse transpositions applied to the rows. */ template const Product operator*(const MatrixBase& matrix) const { return Product(*this, matrix.derived()); } EIGEN_DEVICE_FUNC const TranspositionType& nestedExpression() const { return m_transpositions; } protected: const TranspositionType& m_transpositions; }; } // end namespace Eigen #endif // EIGEN_TRANSPOSITIONS_H