Eigen/src/Cholesky/LLT.h - mirror - Git at Google

 // This file is part of Eigen, a lightweight C++ template library
 // for linear algebra.
 //
 // Copyright (C) 2008 Gael Guennebaud <g.gael@free.fr>
 //
 // Eigen is free software; you can redistribute it and/or
 // modify it under the terms of the GNU Lesser General Public
 // License as published by the Free Software Foundation; either
 // version 3 of the License, or (at your option) any later version.
 //
 // Alternatively, you can redistribute it and/or
 // modify it under the terms of the GNU General Public License as
 // published by the Free Software Foundation; either version 2 of
 // the License, or (at your option) any later version.
 //
 // Eigen is distributed in the hope that it will be useful, but WITHOUT ANY
 // WARRANTY; without even the implied warranty of MERCHANTABILITY or FITNESS
 // FOR A PARTICULAR PURPOSE. See the GNU Lesser General Public License or the
 // GNU General Public License for more details.
 //
 // You should have received a copy of the GNU Lesser General Public
 // License and a copy of the GNU General Public License along with
 // Eigen. If not, see <http://www.gnu.org/licenses/>.

 #ifndef EIGEN_LLT_H
 #define EIGEN_LLT_H

 template<typename MatrixType, int UpLo> struct LLT_Traits;

 /** \ingroup cholesky_Module
   *
   * \class LLT
   *
   * \brief Standard Cholesky decomposition (LL^T) of a matrix and associated features
   *
   * \param MatrixType the type of the matrix of which we are computing the LL^T Cholesky decomposition
   *
   * This class performs a LL^T Cholesky decomposition of a symmetric, positive definite
   * matrix A such that A = LL^* = U^*U, where L is lower triangular.
   *
   * While the Cholesky decomposition is particularly useful to solve selfadjoint problems like  D^*D x = b,
   * for that purpose, we recommend the Cholesky decomposition without square root which is more stable
   * and even faster. Nevertheless, this standard Cholesky decomposition remains useful in many other
   * situations like generalised eigen problems with hermitian matrices.
   *
   * Remember that Cholesky decompositions are not rank-revealing. This LLT decomposition is only stable on positive definite matrices,
   * use LDLT instead for the semidefinite case. Also, do not use a Cholesky decomposition to determine whether a system of equations
   * has a solution.
   *
   * \sa MatrixBase::llt(), class LDLT
   */
  /* HEY THIS DOX IS DISABLED BECAUSE THERE's A BUG EITHER HERE OR IN LDLT ABOUT THAT (OR BOTH)
   * Note that during the decomposition, only the upper triangular part of A is considered. Therefore,
   * the strict lower part does not have to store correct values.
   */
 template<typename MatrixType, int _UpLo> class LLT
 {
   private:
     typedef typename MatrixType::Scalar Scalar;
     typedef typename NumTraits<typename MatrixType::Scalar>::Real RealScalar;
     typedef Matrix<Scalar, MatrixType::ColsAtCompileTime, 1> VectorType;

     enum {
       PacketSize = ei_packet_traits<Scalar>::size,
       AlignmentMask = int(PacketSize)-1,
       UpLo = _UpLo
     };

     typedef LLT_Traits<MatrixType,UpLo> Traits;

   public:

     /**
     * \brief Default Constructor.
     *
     * The default constructor is useful in cases in which the user intends to
     * perform decompositions via LLT::compute(const MatrixType&).
     */
     LLT() : m_matrix(), m_isInitialized(false) {}

     LLT(const MatrixType& matrix)
       : m_matrix(matrix.rows(), matrix.cols()),
         m_isInitialized(false)
     {
       compute(matrix);
     }

     /** \returns a view of the upper triangular matrix U */
     inline typename Traits::MatrixU matrixU() const
     {
       ei_assert(m_isInitialized && "LLT is not initialized.");
       return Traits::getU(m_matrix);
     }

     /** \returns a view of the lower triangular matrix L */
     inline typename Traits::MatrixL matrixL() const
     {
       ei_assert(m_isInitialized && "LLT is not initialized.");
       return Traits::getL(m_matrix);
     }

     template<typename RhsDerived, typename ResultType>
     bool solve(const MatrixBase<RhsDerived> &b, ResultType *result) const;

     template<typename Derived>
     bool solveInPlace(MatrixBase<Derived> &bAndX) const;

     LLT& compute(const MatrixType& matrix);

   protected:
     /** \internal
       * Used to compute and store L
       * The strict upper part is not used and even not initialized.
       */
     MatrixType m_matrix;
     bool m_isInitialized;
 };

 // forward declaration (defined at the end of this file)
 template<int UpLo> struct ei_llt_inplace;

 template<> struct ei_llt_inplace<LowerTriangular>
 {
   template<typename MatrixType>
   static bool unblocked(MatrixType& mat)
   {
     typedef typename MatrixType::Scalar Scalar;
     typedef typename MatrixType::RealScalar RealScalar;
     ei_assert(mat.rows()==mat.cols());
     const int size = mat.rows();
     for(int k = 0; k < size; ++k)
     {
       int rs = size-k-1; // remaining size

       Block<MatrixType,Dynamic,1> A21(mat,k+1,k,rs,1);
       Block<MatrixType,1,Dynamic> A10(mat,k,0,1,k);
       Block<MatrixType,Dynamic,Dynamic> A20(mat,k+1,0,rs,k);

       RealScalar x = ei_real(mat.coeff(k,k));
       if (k>0) x -= mat.row(k).start(k).squaredNorm();
       if (x<=RealScalar(0))
         return false;
       mat.coeffRef(k,k) = x = ei_sqrt(x);
       if (k>0 && rs>0) A21.noalias() -= A20 * A10.adjoint();
       if (rs>0) A21 *= RealScalar(1)/x;
     }
     return true;
   }

   template<typename MatrixType>
   static bool blocked(MatrixType& m)
   {
     ei_assert(m.rows()==m.cols());
     int size = m.rows();
     if(size<32)
       return unblocked(m);

     int blockSize = size/8;
     blockSize = (blockSize/16)*16;
     blockSize = std::min(std::max(blockSize,8), 128);

     for (int k=0; k<size; k+=blockSize)
     {
       int bs = std::min(blockSize, size-k);
       int rs = size - k - bs;

       Block<MatrixType,Dynamic,Dynamic> A11(m,k,   k,   bs,bs);
       Block<MatrixType,Dynamic,Dynamic> A21(m,k+bs,k,   rs,bs);
       Block<MatrixType,Dynamic,Dynamic> A22(m,k+bs,k+bs,rs,rs);

       if(!unblocked(A11)) return false;
       if(rs>0) A11.adjoint().template triangularView<UpperTriangular>().template solveInPlace<OnTheRight>(A21);
       if(rs>0) A22.template selfadjointView<LowerTriangular>().rankUpdate(A21,-1); // bottleneck
     }
     return true;
   }
 };

 template<> struct ei_llt_inplace<UpperTriangular>
 {
   template<typename MatrixType>
   static EIGEN_STRONG_INLINE bool unblocked(MatrixType& mat)
   {
     Transpose<MatrixType> matt(mat);
     return ei_llt_inplace<LowerTriangular>::unblocked(matt);
   }
   template<typename MatrixType>
   static EIGEN_STRONG_INLINE bool blocked(MatrixType& mat)
   {
     Transpose<MatrixType> matt(mat);
     return ei_llt_inplace<LowerTriangular>::blocked(matt);
   }
 };

 template<typename MatrixType> struct LLT_Traits<MatrixType,LowerTriangular>
 {
   typedef TriangularView<MatrixType, LowerTriangular> MatrixL;
   typedef TriangularView<NestByValue<typename MatrixType::AdjointReturnType>, UpperTriangular> MatrixU;
   inline static MatrixL getL(const MatrixType& m) { return m; }
   inline static MatrixU getU(const MatrixType& m) { return m.adjoint().nestByValue(); }
   static bool inplace_decomposition(MatrixType& m)
   { return ei_llt_inplace<LowerTriangular>::blocked(m); }
 };

 template<typename MatrixType> struct LLT_Traits<MatrixType,UpperTriangular>
 {
   typedef TriangularView<NestByValue<typename MatrixType::AdjointReturnType>, LowerTriangular> MatrixL;
   typedef TriangularView<MatrixType, UpperTriangular> MatrixU;
   inline static MatrixL getL(const MatrixType& m) { return m.adjoint().nestByValue(); }
   inline static MatrixU getU(const MatrixType& m) { return m; }
   static bool inplace_decomposition(MatrixType& m)
   { return ei_llt_inplace<UpperTriangular>::blocked(m); }
 };

 /** Computes / recomputes the Cholesky decomposition A = LL^* = U^*U of \a matrix
   *
   *
   * \returns a reference to *this
   */
 template<typename MatrixType, int _UpLo>
 LLT<MatrixType,_UpLo>& LLT<MatrixType,_UpLo>::compute(const MatrixType& a)
 {
   assert(a.rows()==a.cols());
   const int size = a.rows();
   m_matrix.resize(size, size);
   m_matrix = a;

   m_isInitialized = Traits::inplace_decomposition(m_matrix);
   return *this;
 }

 /** Computes the solution x of \f$ A x = b \f$ using the current decomposition of A.
   * The result is stored in \a result
   *
   * \returns true always! If you need to check for existence of solutions, use another decomposition like LU, QR, or SVD.
   *
   * In other words, it computes \f$ b = A^{-1} b \f$ with
   * \f$ {L^{*}}^{-1} L^{-1} b \f$ from right to left.
   *
   * Example: \include LLT_solve.cpp
   * Output: \verbinclude LLT_solve.out
   *
   * \sa LLT::solveInPlace(), MatrixBase::llt()
   */
 template<typename MatrixType, int _UpLo>
 template<typename RhsDerived, typename ResultType>
 bool LLT<MatrixType,_UpLo>::solve(const MatrixBase<RhsDerived> &b, ResultType *result) const
 {
   ei_assert(m_isInitialized && "LLT is not initialized.");
   const int size = m_matrix.rows();
   ei_assert(size==b.rows() && "LLT::solve(): invalid number of rows of the right hand side matrix b");
   return solveInPlace((*result) = b);
 }

 /** This is the \em in-place version of solve().
   *
   * \param bAndX represents both the right-hand side matrix b and result x.
   *
   * \returns true always! If you need to check for existence of solutions, use another decomposition like LU, QR, or SVD.
   *
   * This version avoids a copy when the right hand side matrix b is not
   * needed anymore.
   *
   * \sa LLT::solve(), MatrixBase::llt()
   */
 template<typename MatrixType, int _UpLo>
 template<typename Derived>
 bool LLT<MatrixType,_UpLo>::solveInPlace(MatrixBase<Derived> &bAndX) const
 {
   ei_assert(m_isInitialized && "LLT is not initialized.");
   const int size = m_matrix.rows();
   ei_assert(size==bAndX.rows());
   matrixL().solveInPlace(bAndX);
   matrixU().solveInPlace(bAndX);
   return true;
 }

 /** \cholesky_module
   * \returns the LLT decomposition of \c *this
   */
 template<typename Derived>
 inline const LLT<typename MatrixBase<Derived>::PlainMatrixType>
 MatrixBase<Derived>::llt() const
 {
   return LLT<PlainMatrixType>(derived());
 }

 /** \cholesky_module
   * \returns the LLT decomposition of \c *this
   */
 template<typename MatrixType, unsigned int UpLo>
 inline const LLT<typename SelfAdjointView<MatrixType, UpLo>::PlainMatrixType, UpLo>
 SelfAdjointView<MatrixType, UpLo>::llt() const
 {
   return LLT<PlainMatrixType,UpLo>(m_matrix);
 }

 #endif // EIGEN_LLT_H
	// This file is part of Eigen, a lightweight C++ template library
	// for linear algebra.
	//
	// Copyright (C) 2008 Gael Guennebaud <g.gael@free.fr>
	//
	// Eigen is free software; you can redistribute it and/or
	// modify it under the terms of the GNU Lesser General Public
	// License as published by the Free Software Foundation; either
	// version 3 of the License, or (at your option) any later version.
	//
	// Alternatively, you can redistribute it and/or
	// modify it under the terms of the GNU General Public License as
	// published by the Free Software Foundation; either version 2 of
	// the License, or (at your option) any later version.
	//
	// Eigen is distributed in the hope that it will be useful, but WITHOUT ANY
	// WARRANTY; without even the implied warranty of MERCHANTABILITY or FITNESS
	// FOR A PARTICULAR PURPOSE. See the GNU Lesser General Public License or the
	// GNU General Public License for more details.
	//
	// You should have received a copy of the GNU Lesser General Public
	// License and a copy of the GNU General Public License along with
	// Eigen. If not, see <http://www.gnu.org/licenses/>.

	#ifndef EIGEN_LLT_H
	#define EIGEN_LLT_H

	template<typename MatrixType, int UpLo> struct LLT_Traits;

	/** \ingroup cholesky_Module
	*
	* \class LLT
	*
	* \brief Standard Cholesky decomposition (LL^T) of a matrix and associated features
	*
	* \param MatrixType the type of the matrix of which we are computing the LL^T Cholesky decomposition
	*
	* This class performs a LL^T Cholesky decomposition of a symmetric, positive definite
	* matrix A such that A = LL^* = U^*U, where L is lower triangular.
	*
	* While the Cholesky decomposition is particularly useful to solve selfadjoint problems like D^*D x = b,
	* for that purpose, we recommend the Cholesky decomposition without square root which is more stable
	* and even faster. Nevertheless, this standard Cholesky decomposition remains useful in many other
	* situations like generalised eigen problems with hermitian matrices.
	*
	* Remember that Cholesky decompositions are not rank-revealing. This LLT decomposition is only stable on positive definite matrices,
	* use LDLT instead for the semidefinite case. Also, do not use a Cholesky decomposition to determine whether a system of equations
	* has a solution.
	*
	* \sa MatrixBase::llt(), class LDLT
	*/
	/* HEY THIS DOX IS DISABLED BECAUSE THERE's A BUG EITHER HERE OR IN LDLT ABOUT THAT (OR BOTH)
	* Note that during the decomposition, only the upper triangular part of A is considered. Therefore,
	* the strict lower part does not have to store correct values.
	*/
	template<typename MatrixType, int _UpLo> class LLT
	{
	private:
	typedef typename MatrixType::Scalar Scalar;
	typedef typename NumTraits<typename MatrixType::Scalar>::Real RealScalar;
	typedef Matrix<Scalar, MatrixType::ColsAtCompileTime, 1> VectorType;

	enum {
	PacketSize = ei_packet_traits<Scalar>::size,
	AlignmentMask = int(PacketSize)-1,
	UpLo = _UpLo
	};

	typedef LLT_Traits<MatrixType,UpLo> Traits;

	public:

	/**
	* \brief Default Constructor.
	*
	* The default constructor is useful in cases in which the user intends to
	* perform decompositions via LLT::compute(const MatrixType&).
	*/
	LLT() : m_matrix(), m_isInitialized(false) {}

	LLT(const MatrixType& matrix)
	: m_matrix(matrix.rows(), matrix.cols()),
	m_isInitialized(false)
	{
	compute(matrix);
	}

	/** \returns a view of the upper triangular matrix U */
	inline typename Traits::MatrixU matrixU() const
	{
	ei_assert(m_isInitialized && "LLT is not initialized.");
	return Traits::getU(m_matrix);
	}

	/** \returns a view of the lower triangular matrix L */
	inline typename Traits::MatrixL matrixL() const
	{
	ei_assert(m_isInitialized && "LLT is not initialized.");
	return Traits::getL(m_matrix);
	}

	template<typename RhsDerived, typename ResultType>
	bool solve(const MatrixBase<RhsDerived> &b, ResultType *result) const;

	template<typename Derived>
	bool solveInPlace(MatrixBase<Derived> &bAndX) const;

	LLT& compute(const MatrixType& matrix);

	protected:
	/** \internal
	* Used to compute and store L
	* The strict upper part is not used and even not initialized.
	*/
	MatrixType m_matrix;
	bool m_isInitialized;
	};

	// forward declaration (defined at the end of this file)
	template<int UpLo> struct ei_llt_inplace;

	template<> struct ei_llt_inplace<LowerTriangular>
	{
	template<typename MatrixType>
	static bool unblocked(MatrixType& mat)
	{
	typedef typename MatrixType::Scalar Scalar;
	typedef typename MatrixType::RealScalar RealScalar;
	ei_assert(mat.rows()==mat.cols());
	const int size = mat.rows();
	for(int k = 0; k < size; ++k)
	{
	int rs = size-k-1; // remaining size

	Block<MatrixType,Dynamic,1> A21(mat,k+1,k,rs,1);
	Block<MatrixType,1,Dynamic> A10(mat,k,0,1,k);
	Block<MatrixType,Dynamic,Dynamic> A20(mat,k+1,0,rs,k);

	RealScalar x = ei_real(mat.coeff(k,k));
	if (k>0) x -= mat.row(k).start(k).squaredNorm();
	if (x<=RealScalar(0))
	return false;
	mat.coeffRef(k,k) = x = ei_sqrt(x);
	if (k>0 && rs>0) A21.noalias() -= A20 * A10.adjoint();
	if (rs>0) A21 *= RealScalar(1)/x;
	}
	return true;
	}

	template<typename MatrixType>
	static bool blocked(MatrixType& m)
	{
	ei_assert(m.rows()==m.cols());
	int size = m.rows();
	if(size<32)
	return unblocked(m);

	int blockSize = size/8;
	blockSize = (blockSize/16)*16;
	blockSize = std::min(std::max(blockSize,8), 128);

	for (int k=0; k<size; k+=blockSize)
	{
	int bs = std::min(blockSize, size-k);
	int rs = size - k - bs;

	Block<MatrixType,Dynamic,Dynamic> A11(m,k, k, bs,bs);
	Block<MatrixType,Dynamic,Dynamic> A21(m,k+bs,k, rs,bs);
	Block<MatrixType,Dynamic,Dynamic> A22(m,k+bs,k+bs,rs,rs);

	if(!unblocked(A11)) return false;
	if(rs>0) A11.adjoint().template triangularView<UpperTriangular>().template solveInPlace<OnTheRight>(A21);
	if(rs>0) A22.template selfadjointView<LowerTriangular>().rankUpdate(A21,-1); // bottleneck
	}
	return true;
	}
	};

	template<> struct ei_llt_inplace<UpperTriangular>
	{
	template<typename MatrixType>
	static EIGEN_STRONG_INLINE bool unblocked(MatrixType& mat)
	{
	Transpose<MatrixType> matt(mat);
	return ei_llt_inplace<LowerTriangular>::unblocked(matt);
	}
	template<typename MatrixType>
	static EIGEN_STRONG_INLINE bool blocked(MatrixType& mat)
	{
	Transpose<MatrixType> matt(mat);
	return ei_llt_inplace<LowerTriangular>::blocked(matt);
	}
	};

	template<typename MatrixType> struct LLT_Traits<MatrixType,LowerTriangular>
	{
	typedef TriangularView<MatrixType, LowerTriangular> MatrixL;
	typedef TriangularView<NestByValue<typename MatrixType::AdjointReturnType>, UpperTriangular> MatrixU;
	inline static MatrixL getL(const MatrixType& m) { return m; }
	inline static MatrixU getU(const MatrixType& m) { return m.adjoint().nestByValue(); }
	static bool inplace_decomposition(MatrixType& m)
	{ return ei_llt_inplace<LowerTriangular>::blocked(m); }
	};

	template<typename MatrixType> struct LLT_Traits<MatrixType,UpperTriangular>
	{
	typedef TriangularView<NestByValue<typename MatrixType::AdjointReturnType>, LowerTriangular> MatrixL;
	typedef TriangularView<MatrixType, UpperTriangular> MatrixU;
	inline static MatrixL getL(const MatrixType& m) { return m.adjoint().nestByValue(); }
	inline static MatrixU getU(const MatrixType& m) { return m; }
	static bool inplace_decomposition(MatrixType& m)
	{ return ei_llt_inplace<UpperTriangular>::blocked(m); }
	};

	/** Computes / recomputes the Cholesky decomposition A = LL^* = U^*U of \a matrix
	*
	*
	* \returns a reference to *this
	*/
	template<typename MatrixType, int _UpLo>
	LLT<MatrixType,_UpLo>& LLT<MatrixType,_UpLo>::compute(const MatrixType& a)
	{
	assert(a.rows()==a.cols());
	const int size = a.rows();
	m_matrix.resize(size, size);
	m_matrix = a;

	m_isInitialized = Traits::inplace_decomposition(m_matrix);
	return *this;
	}

	/** Computes the solution x of \f$ A x = b \f$ using the current decomposition of A.
	* The result is stored in \a result
	*
	* \returns true always! If you need to check for existence of solutions, use another decomposition like LU, QR, or SVD.
	*
	* In other words, it computes \f$ b = A^{-1} b \f$ with
	* \f$ {L^{*}}^{-1} L^{-1} b \f$ from right to left.
	*
	* Example: \include LLT_solve.cpp
	* Output: \verbinclude LLT_solve.out
	*
	* \sa LLT::solveInPlace(), MatrixBase::llt()
	*/
	template<typename MatrixType, int _UpLo>
	template<typename RhsDerived, typename ResultType>
	bool LLT<MatrixType,_UpLo>::solve(const MatrixBase<RhsDerived> &b, ResultType *result) const
	{
	ei_assert(m_isInitialized && "LLT is not initialized.");
	const int size = m_matrix.rows();
	ei_assert(size==b.rows() && "LLT::solve(): invalid number of rows of the right hand side matrix b");
	return solveInPlace((*result) = b);
	}

	/** This is the \em in-place version of solve().
	*
	* \param bAndX represents both the right-hand side matrix b and result x.
	*
	* \returns true always! If you need to check for existence of solutions, use another decomposition like LU, QR, or SVD.
	*
	* This version avoids a copy when the right hand side matrix b is not
	* needed anymore.
	*
	* \sa LLT::solve(), MatrixBase::llt()
	*/
	template<typename MatrixType, int _UpLo>
	template<typename Derived>
	bool LLT<MatrixType,_UpLo>::solveInPlace(MatrixBase<Derived> &bAndX) const
	{
	ei_assert(m_isInitialized && "LLT is not initialized.");
	const int size = m_matrix.rows();
	ei_assert(size==bAndX.rows());
	matrixL().solveInPlace(bAndX);
	matrixU().solveInPlace(bAndX);
	return true;
	}

	/** \cholesky_module
	* \returns the LLT decomposition of \c *this
	*/
	template<typename Derived>
	inline const LLT<typename MatrixBase<Derived>::PlainMatrixType>
	MatrixBase<Derived>::llt() const
	{
	return LLT<PlainMatrixType>(derived());
	}

	/** \cholesky_module
	* \returns the LLT decomposition of \c *this
	*/
	template<typename MatrixType, unsigned int UpLo>
	inline const LLT<typename SelfAdjointView<MatrixType, UpLo>::PlainMatrixType, UpLo>
	SelfAdjointView<MatrixType, UpLo>::llt() const
	{
	return LLT<PlainMatrixType,UpLo>(m_matrix);
	}

	#endif // EIGEN_LLT_H