Eigen/src/Core/products/SelfadjointRank2Update.h - eigen - Git at Google

 // This file is part of Eigen, a lightweight C++ template library
 // for linear algebra.
 //
 // Copyright (C) 2009 Gael Guennebaud <gael.guennebaud@inria.fr>
 //
 // 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_SELFADJOINTRANK2UPTADE_H
 #define EIGEN_SELFADJOINTRANK2UPTADE_H

 namespace Eigen {

 namespace internal {

 /* Optimized selfadjoint matrix += alpha * uv' + conj(alpha)*vu'
  * It corresponds to the Level2 syr2 BLAS routine
  */

 template<typename Scalar, typename Index, typename UType, typename VType, int UpLo>
 struct selfadjoint_rank2_update_selector;

 template<typename Scalar, typename Index, typename UType, typename VType>
 struct selfadjoint_rank2_update_selector<Scalar,Index,UType,VType,Lower>
 {
   static EIGEN_DEVICE_FUNC
   void run(Scalar* mat, Index stride, const UType& u, const VType& v, const Scalar& alpha)
   {
     const Index size = u.size();
     for (Index i=0; i<size; ++i)
     {
       Map<Matrix<Scalar,Dynamic,1> >(mat+stride*i+i, size-i) +=
                         (numext::conj(alpha) * numext::conj(u.coeff(i))) * v.tail(size-i)
                       + (alpha * numext::conj(v.coeff(i))) * u.tail(size-i);
     }
   }
 };

 template<typename Scalar, typename Index, typename UType, typename VType>
 struct selfadjoint_rank2_update_selector<Scalar,Index,UType,VType,Upper>
 {
   static void run(Scalar* mat, Index stride, const UType& u, const VType& v, const Scalar& alpha)
   {
     const Index size = u.size();
     for (Index i=0; i<size; ++i)
       Map<Matrix<Scalar,Dynamic,1> >(mat+stride*i, i+1) +=
                         (numext::conj(alpha)  * numext::conj(u.coeff(i))) * v.head(i+1)
                       + (alpha * numext::conj(v.coeff(i))) * u.head(i+1);
   }
 };

 template<bool Cond, typename T> struct conj_expr_if
   : conditional<!Cond, const T&,
       CwiseUnaryOp<scalar_conjugate_op<typename traits<T>::Scalar>,T> > {};

 } // end namespace internal

 template<typename MatrixType, unsigned int UpLo>
 template<typename DerivedU, typename DerivedV>
 EIGEN_DEVICE_FUNC SelfAdjointView<MatrixType,UpLo>& SelfAdjointView<MatrixType,UpLo>
 ::rankUpdate(const MatrixBase<DerivedU>& u, const MatrixBase<DerivedV>& v, const Scalar& alpha)
 {
   typedef internal::blas_traits<DerivedU> UBlasTraits;
   typedef typename UBlasTraits::DirectLinearAccessType ActualUType;
   typedef typename internal::remove_all<ActualUType>::type _ActualUType;
   typename internal::add_const_on_value_type<ActualUType>::type actualU = UBlasTraits::extract(u.derived());

   typedef internal::blas_traits<DerivedV> VBlasTraits;
   typedef typename VBlasTraits::DirectLinearAccessType ActualVType;
   typedef typename internal::remove_all<ActualVType>::type _ActualVType;
   typename internal::add_const_on_value_type<ActualVType>::type actualV = VBlasTraits::extract(v.derived());

   // If MatrixType is row major, then we use the routine for lower triangular in the upper triangular case and
   // vice versa, and take the complex conjugate of all coefficients and vector entries.

   enum { IsRowMajor = (internal::traits<MatrixType>::Flags&RowMajorBit) ? 1 : 0 };
   Scalar actualAlpha = alpha * UBlasTraits::extractScalarFactor(u.derived())
                              * numext::conj(VBlasTraits::extractScalarFactor(v.derived()));
   if (IsRowMajor)
     actualAlpha = numext::conj(actualAlpha);

   typedef typename internal::remove_all<typename internal::conj_expr_if<IsRowMajor ^ UBlasTraits::NeedToConjugate,_ActualUType>::type>::type UType;
   typedef typename internal::remove_all<typename internal::conj_expr_if<IsRowMajor ^ VBlasTraits::NeedToConjugate,_ActualVType>::type>::type VType;
   internal::selfadjoint_rank2_update_selector<Scalar, Index, UType, VType,
     (IsRowMajor ? int(UpLo==Upper ? Lower : Upper) : UpLo)>
     ::run(_expression().const_cast_derived().data(),_expression().outerStride(),UType(actualU),VType(actualV),actualAlpha);

   return *this;
 }

 } // end namespace Eigen

 #endif // EIGEN_SELFADJOINTRANK2UPTADE_H
	// This file is part of Eigen, a lightweight C++ template library
	// for linear algebra.
	//
	// Copyright (C) 2009 Gael Guennebaud <gael.guennebaud@inria.fr>
	//
	// 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_SELFADJOINTRANK2UPTADE_H
	#define EIGEN_SELFADJOINTRANK2UPTADE_H

	namespace Eigen {

	namespace internal {

	/* Optimized selfadjoint matrix += alpha * uv' + conj(alpha)*vu'
	* It corresponds to the Level2 syr2 BLAS routine
	*/

	template<typename Scalar, typename Index, typename UType, typename VType, int UpLo>
	struct selfadjoint_rank2_update_selector;

	template<typename Scalar, typename Index, typename UType, typename VType>
	struct selfadjoint_rank2_update_selector<Scalar,Index,UType,VType,Lower>
	{
	static EIGEN_DEVICE_FUNC
	void run(Scalar* mat, Index stride, const UType& u, const VType& v, const Scalar& alpha)
	{
	const Index size = u.size();
	for (Index i=0; i<size; ++i)
	{
	Map<Matrix<Scalar,Dynamic,1> >(mat+stride*i+i, size-i) +=
	(numext::conj(alpha) * numext::conj(u.coeff(i))) * v.tail(size-i)
	+ (alpha * numext::conj(v.coeff(i))) * u.tail(size-i);
	}
	}
	};

	template<typename Scalar, typename Index, typename UType, typename VType>
	struct selfadjoint_rank2_update_selector<Scalar,Index,UType,VType,Upper>
	{
	static void run(Scalar* mat, Index stride, const UType& u, const VType& v, const Scalar& alpha)
	{
	const Index size = u.size();
	for (Index i=0; i<size; ++i)
	Map<Matrix<Scalar,Dynamic,1> >(mat+stride*i, i+1) +=
	(numext::conj(alpha) * numext::conj(u.coeff(i))) * v.head(i+1)
	+ (alpha * numext::conj(v.coeff(i))) * u.head(i+1);
	}
	};

	template<bool Cond, typename T> struct conj_expr_if
	: conditional<!Cond, const T&,
	CwiseUnaryOp<scalar_conjugate_op<typename traits<T>::Scalar>,T> > {};

	} // end namespace internal

	template<typename MatrixType, unsigned int UpLo>
	template<typename DerivedU, typename DerivedV>
	EIGEN_DEVICE_FUNC SelfAdjointView<MatrixType,UpLo>& SelfAdjointView<MatrixType,UpLo>
	::rankUpdate(const MatrixBase<DerivedU>& u, const MatrixBase<DerivedV>& v, const Scalar& alpha)
	{
	typedef internal::blas_traits<DerivedU> UBlasTraits;
	typedef typename UBlasTraits::DirectLinearAccessType ActualUType;
	typedef typename internal::remove_all<ActualUType>::type _ActualUType;
	typename internal::add_const_on_value_type<ActualUType>::type actualU = UBlasTraits::extract(u.derived());

	typedef internal::blas_traits<DerivedV> VBlasTraits;
	typedef typename VBlasTraits::DirectLinearAccessType ActualVType;
	typedef typename internal::remove_all<ActualVType>::type _ActualVType;
	typename internal::add_const_on_value_type<ActualVType>::type actualV = VBlasTraits::extract(v.derived());

	// If MatrixType is row major, then we use the routine for lower triangular in the upper triangular case and
	// vice versa, and take the complex conjugate of all coefficients and vector entries.

	enum { IsRowMajor = (internal::traits<MatrixType>::Flags&RowMajorBit) ? 1 : 0 };
	Scalar actualAlpha = alpha * UBlasTraits::extractScalarFactor(u.derived())
	* numext::conj(VBlasTraits::extractScalarFactor(v.derived()));
	if (IsRowMajor)
	actualAlpha = numext::conj(actualAlpha);

	typedef typename internal::remove_all<typename internal::conj_expr_if<IsRowMajor ^ UBlasTraits::NeedToConjugate,_ActualUType>::type>::type UType;
	typedef typename internal::remove_all<typename internal::conj_expr_if<IsRowMajor ^ VBlasTraits::NeedToConjugate,_ActualVType>::type>::type VType;
	internal::selfadjoint_rank2_update_selector<Scalar, Index, UType, VType,
	(IsRowMajor ? int(UpLo==Upper ? Lower : Upper) : UpLo)>
	::run(_expression().const_cast_derived().data(),_expression().outerStride(),UType(actualU),VType(actualV),actualAlpha);

	return *this;
	}

	} // end namespace Eigen

	#endif // EIGEN_SELFADJOINTRANK2UPTADE_H