unsupported/Eigen/src/MatrixFunctions/MatrixSquareRoot.h - eigen - Git at Google

 // This file is part of Eigen, a lightweight C++ template library
 // for linear algebra.
 //
 // Copyright (C) 2011, 2013 Jitse Niesen <jitse@maths.leeds.ac.uk>
 //
 // 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_MATRIX_SQUARE_ROOT
 #define EIGEN_MATRIX_SQUARE_ROOT

 namespace Eigen {

 namespace internal {

 // pre:  T.block(i,i,2,2) has complex conjugate eigenvalues
 // post: sqrtT.block(i,i,2,2) is square root of T.block(i,i,2,2)
 template <typename MatrixType, typename ResultType>
 void matrix_sqrt_quasi_triangular_2x2_diagonal_block(const MatrixType& T, Index i, ResultType& sqrtT)
 {
   // TODO: This case (2-by-2 blocks with complex conjugate eigenvalues) is probably hidden somewhere
   //       in EigenSolver. If we expose it, we could call it directly from here.
   typedef typename traits<MatrixType>::Scalar Scalar;
   Matrix<Scalar,2,2> block = T.template block<2,2>(i,i);
   EigenSolver<Matrix<Scalar,2,2> > es(block);
   sqrtT.template block<2,2>(i,i)
     = (es.eigenvectors() * es.eigenvalues().cwiseSqrt().asDiagonal() * es.eigenvectors().inverse()).real();
 }

 // pre:  block structure of T is such that (i,j) is a 1x1 block,
 //       all blocks of sqrtT to left of and below (i,j) are correct
 // post: sqrtT(i,j) has the correct value
 template <typename MatrixType, typename ResultType>
 void matrix_sqrt_quasi_triangular_1x1_off_diagonal_block(const MatrixType& T, Index i, Index j, ResultType& sqrtT)
 {
   typedef typename traits<MatrixType>::Scalar Scalar;
   Scalar tmp = (sqrtT.row(i).segment(i+1,j-i-1) * sqrtT.col(j).segment(i+1,j-i-1)).value();
   sqrtT.coeffRef(i,j) = (T.coeff(i,j) - tmp) / (sqrtT.coeff(i,i) + sqrtT.coeff(j,j));
 }

 // similar to compute1x1offDiagonalBlock()
 template <typename MatrixType, typename ResultType>
 void matrix_sqrt_quasi_triangular_1x2_off_diagonal_block(const MatrixType& T, Index i, Index j, ResultType& sqrtT)
 {
   typedef typename traits<MatrixType>::Scalar Scalar;
   Matrix<Scalar,1,2> rhs = T.template block<1,2>(i,j);
   if (j-i > 1)
     rhs -= sqrtT.block(i, i+1, 1, j-i-1) * sqrtT.block(i+1, j, j-i-1, 2);
   Matrix<Scalar,2,2> A = sqrtT.coeff(i,i) * Matrix<Scalar,2,2>::Identity();
   A += sqrtT.template block<2,2>(j,j).transpose();
   sqrtT.template block<1,2>(i,j).transpose() = A.fullPivLu().solve(rhs.transpose());
 }

 // similar to compute1x1offDiagonalBlock()
 template <typename MatrixType, typename ResultType>
 void matrix_sqrt_quasi_triangular_2x1_off_diagonal_block(const MatrixType& T, Index i, Index j, ResultType& sqrtT)
 {
   typedef typename traits<MatrixType>::Scalar Scalar;
   Matrix<Scalar,2,1> rhs = T.template block<2,1>(i,j);
   if (j-i > 2)
     rhs -= sqrtT.block(i, i+2, 2, j-i-2) * sqrtT.block(i+2, j, j-i-2, 1);
   Matrix<Scalar,2,2> A = sqrtT.coeff(j,j) * Matrix<Scalar,2,2>::Identity();
   A += sqrtT.template block<2,2>(i,i);
   sqrtT.template block<2,1>(i,j) = A.fullPivLu().solve(rhs);
 }

 // solves the equation A X + X B = C where all matrices are 2-by-2
 template <typename MatrixType>
 void matrix_sqrt_quasi_triangular_solve_auxiliary_equation(MatrixType& X, const MatrixType& A, const MatrixType& B, const MatrixType& C)
 {
   typedef typename traits<MatrixType>::Scalar Scalar;
   Matrix<Scalar,4,4> coeffMatrix = Matrix<Scalar,4,4>::Zero();
   coeffMatrix.coeffRef(0,0) = A.coeff(0,0) + B.coeff(0,0);
   coeffMatrix.coeffRef(1,1) = A.coeff(0,0) + B.coeff(1,1);
   coeffMatrix.coeffRef(2,2) = A.coeff(1,1) + B.coeff(0,0);
   coeffMatrix.coeffRef(3,3) = A.coeff(1,1) + B.coeff(1,1);
   coeffMatrix.coeffRef(0,1) = B.coeff(1,0);
   coeffMatrix.coeffRef(0,2) = A.coeff(0,1);
   coeffMatrix.coeffRef(1,0) = B.coeff(0,1);
   coeffMatrix.coeffRef(1,3) = A.coeff(0,1);
   coeffMatrix.coeffRef(2,0) = A.coeff(1,0);
   coeffMatrix.coeffRef(2,3) = B.coeff(1,0);
   coeffMatrix.coeffRef(3,1) = A.coeff(1,0);
   coeffMatrix.coeffRef(3,2) = B.coeff(0,1);

   Matrix<Scalar,4,1> rhs;
   rhs.coeffRef(0) = C.coeff(0,0);
   rhs.coeffRef(1) = C.coeff(0,1);
   rhs.coeffRef(2) = C.coeff(1,0);
   rhs.coeffRef(3) = C.coeff(1,1);

   Matrix<Scalar,4,1> result;
   result = coeffMatrix.fullPivLu().solve(rhs);

   X.coeffRef(0,0) = result.coeff(0);
   X.coeffRef(0,1) = result.coeff(1);
   X.coeffRef(1,0) = result.coeff(2);
   X.coeffRef(1,1) = result.coeff(3);
 }

 // similar to compute1x1offDiagonalBlock()
 template <typename MatrixType, typename ResultType>
 void matrix_sqrt_quasi_triangular_2x2_off_diagonal_block(const MatrixType& T, Index i, Index j, ResultType& sqrtT)
 {
   typedef typename traits<MatrixType>::Scalar Scalar;
   Matrix<Scalar,2,2> A = sqrtT.template block<2,2>(i,i);
   Matrix<Scalar,2,2> B = sqrtT.template block<2,2>(j,j);
   Matrix<Scalar,2,2> C = T.template block<2,2>(i,j);
   if (j-i > 2)
     C -= sqrtT.block(i, i+2, 2, j-i-2) * sqrtT.block(i+2, j, j-i-2, 2);
   Matrix<Scalar,2,2> X;
   matrix_sqrt_quasi_triangular_solve_auxiliary_equation(X, A, B, C);
   sqrtT.template block<2,2>(i,j) = X;
 }

 // pre:  T is quasi-upper-triangular and sqrtT is a zero matrix of the same size
 // post: the diagonal blocks of sqrtT are the square roots of the diagonal blocks of T
 template <typename MatrixType, typename ResultType>
 void matrix_sqrt_quasi_triangular_diagonal(const MatrixType& T, ResultType& sqrtT)
 {
   using std::sqrt;
   const Index size = T.rows();
   for (Index i = 0; i < size; i++) {
     if (i == size - 1 || T.coeff(i+1, i) == 0) {
       eigen_assert(T(i,i) >= 0);
       sqrtT.coeffRef(i,i) = sqrt(T.coeff(i,i));
     }
     else {
       matrix_sqrt_quasi_triangular_2x2_diagonal_block(T, i, sqrtT);
       ++i;
     }
   }
 }

 // pre:  T is quasi-upper-triangular and diagonal blocks of sqrtT are square root of diagonal blocks of T.
 // post: sqrtT is the square root of T.
 template <typename MatrixType, typename ResultType>
 void matrix_sqrt_quasi_triangular_off_diagonal(const MatrixType& T, ResultType& sqrtT)
 {
   const Index size = T.rows();
   for (Index j = 1; j < size; j++) {
       if (T.coeff(j, j-1) != 0)  // if T(j-1:j, j-1:j) is a 2-by-2 block
 	continue;
     for (Index i = j-1; i >= 0; i--) {
       if (i > 0 && T.coeff(i, i-1) != 0)  // if T(i-1:i, i-1:i) is a 2-by-2 block
 	continue;
       bool iBlockIs2x2 = (i < size - 1) && (T.coeff(i+1, i) != 0);
       bool jBlockIs2x2 = (j < size - 1) && (T.coeff(j+1, j) != 0);
       if (iBlockIs2x2 && jBlockIs2x2)
         matrix_sqrt_quasi_triangular_2x2_off_diagonal_block(T, i, j, sqrtT);
       else if (iBlockIs2x2 && !jBlockIs2x2)
         matrix_sqrt_quasi_triangular_2x1_off_diagonal_block(T, i, j, sqrtT);
       else if (!iBlockIs2x2 && jBlockIs2x2)
         matrix_sqrt_quasi_triangular_1x2_off_diagonal_block(T, i, j, sqrtT);
       else if (!iBlockIs2x2 && !jBlockIs2x2)
         matrix_sqrt_quasi_triangular_1x1_off_diagonal_block(T, i, j, sqrtT);
     }
   }
 }

 } // end of namespace internal

 /** \ingroup MatrixFunctions_Module
   * \brief Compute matrix square root of quasi-triangular matrix.
   *
   * \tparam  MatrixType  type of \p arg, the argument of matrix square root,
   *                      expected to be an instantiation of the Matrix class template.
   * \tparam  ResultType  type of \p result, where result is to be stored.
   * \param[in]  arg      argument of matrix square root.
   * \param[out] result   matrix square root of upper Hessenberg part of \p arg.
   *
   * This function computes the square root of the upper quasi-triangular matrix stored in the upper
   * Hessenberg part of \p arg.  Only the upper Hessenberg part of \p result is updated, the rest is
   * not touched.  See MatrixBase::sqrt() for details on how this computation is implemented.
   *
   * \sa MatrixSquareRoot, MatrixSquareRootQuasiTriangular
   */
 template <typename MatrixType, typename ResultType>
 void matrix_sqrt_quasi_triangular(const MatrixType &arg, ResultType &result)
 {
   eigen_assert(arg.rows() == arg.cols());
   result.resize(arg.rows(), arg.cols());
   internal::matrix_sqrt_quasi_triangular_diagonal(arg, result);
   internal::matrix_sqrt_quasi_triangular_off_diagonal(arg, result);
 }


 /** \ingroup MatrixFunctions_Module
   * \brief Compute matrix square root of triangular matrix.
   *
   * \tparam  MatrixType  type of \p arg, the argument of matrix square root,
   *                      expected to be an instantiation of the Matrix class template.
   * \tparam  ResultType  type of \p result, where result is to be stored.
   * \param[in]  arg      argument of matrix square root.
   * \param[out] result   matrix square root of upper triangular part of \p arg.
   *
   * Only the upper triangular part (including the diagonal) of \p result is updated, the rest is not
   * touched.  See MatrixBase::sqrt() for details on how this computation is implemented.
   *
   * \sa MatrixSquareRoot, MatrixSquareRootQuasiTriangular
   */
 template <typename MatrixType, typename ResultType>
 void matrix_sqrt_triangular(const MatrixType &arg, ResultType &result)
 {
   using std::sqrt;
   typedef typename MatrixType::Scalar Scalar;

   eigen_assert(arg.rows() == arg.cols());

   // Compute square root of arg and store it in upper triangular part of result
   // This uses that the square root of triangular matrices can be computed directly.
   result.resize(arg.rows(), arg.cols());
   for (Index i = 0; i < arg.rows(); i++) {
     result.coeffRef(i,i) = sqrt(arg.coeff(i,i));
   }
   for (Index j = 1; j < arg.cols(); j++) {
     for (Index i = j-1; i >= 0; i--) {
       // if i = j-1, then segment has length 0 so tmp = 0
       Scalar tmp = (result.row(i).segment(i+1,j-i-1) * result.col(j).segment(i+1,j-i-1)).value();
       // denominator may be zero if original matrix is singular
       result.coeffRef(i,j) = (arg.coeff(i,j) - tmp) / (result.coeff(i,i) + result.coeff(j,j));
     }
   }
 }


 namespace internal {

 /** \ingroup MatrixFunctions_Module
   * \brief Helper struct for computing matrix square roots of general matrices.
   * \tparam  MatrixType  type of the argument of the matrix square root,
   *                      expected to be an instantiation of the Matrix class template.
   *
   * \sa MatrixSquareRootTriangular, MatrixSquareRootQuasiTriangular, MatrixBase::sqrt()
   */
 template <typename MatrixType, int IsComplex = NumTraits<typename internal::traits<MatrixType>::Scalar>::IsComplex>
 struct matrix_sqrt_compute
 {
   /** \brief Compute the matrix square root
     *
     * \param[in]  arg     matrix whose square root is to be computed.
     * \param[out] result  square root of \p arg.
     *
     * See MatrixBase::sqrt() for details on how this computation is implemented.
     */
   template <typename ResultType> static void run(const MatrixType &arg, ResultType &result);
 };


 // ********** Partial specialization for real matrices **********

 template <typename MatrixType>
 struct matrix_sqrt_compute<MatrixType, 0>
 {
   template <typename ResultType>
   static void run(const MatrixType &arg, ResultType &result)
   {
     eigen_assert(arg.rows() == arg.cols());

     // Compute Schur decomposition of arg
     const RealSchur<MatrixType> schurOfA(arg);
     const MatrixType& T = schurOfA.matrixT();
     const MatrixType& U = schurOfA.matrixU();

     // Compute square root of T
     MatrixType sqrtT = MatrixType::Zero(arg.rows(), arg.cols());
     matrix_sqrt_quasi_triangular(T, sqrtT);

     // Compute square root of arg
     result = U * sqrtT * U.adjoint();
   }
 };


 // ********** Partial specialization for complex matrices **********

 template <typename MatrixType>
 struct matrix_sqrt_compute<MatrixType, 1>
 {
   template <typename ResultType>
   static void run(const MatrixType &arg, ResultType &result)
   {
     eigen_assert(arg.rows() == arg.cols());

     // Compute Schur decomposition of arg
     const ComplexSchur<MatrixType> schurOfA(arg);
     const MatrixType& T = schurOfA.matrixT();
     const MatrixType& U = schurOfA.matrixU();

     // Compute square root of T
     MatrixType sqrtT;
     matrix_sqrt_triangular(T, sqrtT);

     // Compute square root of arg
     result = U * (sqrtT.template triangularView<Upper>() * U.adjoint());
   }
 };

 } // end namespace internal

 /** \ingroup MatrixFunctions_Module
   *
   * \brief Proxy for the matrix square root of some matrix (expression).
   *
   * \tparam Derived  Type of the argument to the matrix square root.
   *
   * This class holds the argument to the matrix square root until it
   * is assigned or evaluated for some other reason (so the argument
   * should not be changed in the meantime). It is the return type of
   * MatrixBase::sqrt() and most of the time this is the only way it is
   * used.
   */
 template<typename Derived> class MatrixSquareRootReturnValue
 : public ReturnByValue<MatrixSquareRootReturnValue<Derived> >
 {
   protected:
     typedef typename internal::ref_selector<Derived>::type DerivedNested;

   public:
     /** \brief Constructor.
       *
       * \param[in]  src  %Matrix (expression) forming the argument of the
       * matrix square root.
       */
     explicit MatrixSquareRootReturnValue(const Derived& src) : m_src(src) { }

     /** \brief Compute the matrix square root.
       *
       * \param[out]  result  the matrix square root of \p src in the
       * constructor.
       */
     template <typename ResultType>
     inline void evalTo(ResultType& result) const
     {
       typedef typename internal::nested_eval<Derived, 10>::type DerivedEvalType;
       typedef typename internal::remove_all<DerivedEvalType>::type DerivedEvalTypeClean;
       DerivedEvalType tmp(m_src);
       internal::matrix_sqrt_compute<DerivedEvalTypeClean>::run(tmp, result);
     }

     Index rows() const { return m_src.rows(); }
     Index cols() const { return m_src.cols(); }

   protected:
     const DerivedNested m_src;
 };

 namespace internal {
 template<typename Derived>
 struct traits<MatrixSquareRootReturnValue<Derived> >
 {
   typedef typename Derived::PlainObject ReturnType;
 };
 }

 template <typename Derived>
 const MatrixSquareRootReturnValue<Derived> MatrixBase<Derived>::sqrt() const
 {
   eigen_assert(rows() == cols());
   return MatrixSquareRootReturnValue<Derived>(derived());
 }

 } // end namespace Eigen

 #endif // EIGEN_MATRIX_FUNCTION
	// This file is part of Eigen, a lightweight C++ template library
	// for linear algebra.
	//
	// Copyright (C) 2011, 2013 Jitse Niesen <jitse@maths.leeds.ac.uk>
	//
	// 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_MATRIX_SQUARE_ROOT
	#define EIGEN_MATRIX_SQUARE_ROOT

	namespace Eigen {

	namespace internal {

	// pre: T.block(i,i,2,2) has complex conjugate eigenvalues
	// post: sqrtT.block(i,i,2,2) is square root of T.block(i,i,2,2)
	template <typename MatrixType, typename ResultType>
	void matrix_sqrt_quasi_triangular_2x2_diagonal_block(const MatrixType& T, Index i, ResultType& sqrtT)
	{
	// TODO: This case (2-by-2 blocks with complex conjugate eigenvalues) is probably hidden somewhere
	// in EigenSolver. If we expose it, we could call it directly from here.
	typedef typename traits<MatrixType>::Scalar Scalar;
	Matrix<Scalar,2,2> block = T.template block<2,2>(i,i);
	EigenSolver<Matrix<Scalar,2,2> > es(block);
	sqrtT.template block<2,2>(i,i)
	= (es.eigenvectors() * es.eigenvalues().cwiseSqrt().asDiagonal() * es.eigenvectors().inverse()).real();
	}

	// pre: block structure of T is such that (i,j) is a 1x1 block,
	// all blocks of sqrtT to left of and below (i,j) are correct
	// post: sqrtT(i,j) has the correct value
	template <typename MatrixType, typename ResultType>
	void matrix_sqrt_quasi_triangular_1x1_off_diagonal_block(const MatrixType& T, Index i, Index j, ResultType& sqrtT)
	{
	typedef typename traits<MatrixType>::Scalar Scalar;
	Scalar tmp = (sqrtT.row(i).segment(i+1,j-i-1) * sqrtT.col(j).segment(i+1,j-i-1)).value();
	sqrtT.coeffRef(i,j) = (T.coeff(i,j) - tmp) / (sqrtT.coeff(i,i) + sqrtT.coeff(j,j));
	}

	// similar to compute1x1offDiagonalBlock()
	template <typename MatrixType, typename ResultType>
	void matrix_sqrt_quasi_triangular_1x2_off_diagonal_block(const MatrixType& T, Index i, Index j, ResultType& sqrtT)
	{
	typedef typename traits<MatrixType>::Scalar Scalar;
	Matrix<Scalar,1,2> rhs = T.template block<1,2>(i,j);
	if (j-i > 1)
	rhs -= sqrtT.block(i, i+1, 1, j-i-1) * sqrtT.block(i+1, j, j-i-1, 2);
	Matrix<Scalar,2,2> A = sqrtT.coeff(i,i) * Matrix<Scalar,2,2>::Identity();
	A += sqrtT.template block<2,2>(j,j).transpose();
	sqrtT.template block<1,2>(i,j).transpose() = A.fullPivLu().solve(rhs.transpose());
	}

	// similar to compute1x1offDiagonalBlock()
	template <typename MatrixType, typename ResultType>
	void matrix_sqrt_quasi_triangular_2x1_off_diagonal_block(const MatrixType& T, Index i, Index j, ResultType& sqrtT)
	{
	typedef typename traits<MatrixType>::Scalar Scalar;
	Matrix<Scalar,2,1> rhs = T.template block<2,1>(i,j);
	if (j-i > 2)
	rhs -= sqrtT.block(i, i+2, 2, j-i-2) * sqrtT.block(i+2, j, j-i-2, 1);
	Matrix<Scalar,2,2> A = sqrtT.coeff(j,j) * Matrix<Scalar,2,2>::Identity();
	A += sqrtT.template block<2,2>(i,i);
	sqrtT.template block<2,1>(i,j) = A.fullPivLu().solve(rhs);
	}

	// solves the equation A X + X B = C where all matrices are 2-by-2
	template <typename MatrixType>
	void matrix_sqrt_quasi_triangular_solve_auxiliary_equation(MatrixType& X, const MatrixType& A, const MatrixType& B, const MatrixType& C)
	{
	typedef typename traits<MatrixType>::Scalar Scalar;
	Matrix<Scalar,4,4> coeffMatrix = Matrix<Scalar,4,4>::Zero();
	coeffMatrix.coeffRef(0,0) = A.coeff(0,0) + B.coeff(0,0);
	coeffMatrix.coeffRef(1,1) = A.coeff(0,0) + B.coeff(1,1);
	coeffMatrix.coeffRef(2,2) = A.coeff(1,1) + B.coeff(0,0);
	coeffMatrix.coeffRef(3,3) = A.coeff(1,1) + B.coeff(1,1);
	coeffMatrix.coeffRef(0,1) = B.coeff(1,0);
	coeffMatrix.coeffRef(0,2) = A.coeff(0,1);
	coeffMatrix.coeffRef(1,0) = B.coeff(0,1);
	coeffMatrix.coeffRef(1,3) = A.coeff(0,1);
	coeffMatrix.coeffRef(2,0) = A.coeff(1,0);
	coeffMatrix.coeffRef(2,3) = B.coeff(1,0);
	coeffMatrix.coeffRef(3,1) = A.coeff(1,0);
	coeffMatrix.coeffRef(3,2) = B.coeff(0,1);

	Matrix<Scalar,4,1> rhs;
	rhs.coeffRef(0) = C.coeff(0,0);
	rhs.coeffRef(1) = C.coeff(0,1);
	rhs.coeffRef(2) = C.coeff(1,0);
	rhs.coeffRef(3) = C.coeff(1,1);

	Matrix<Scalar,4,1> result;
	result = coeffMatrix.fullPivLu().solve(rhs);

	X.coeffRef(0,0) = result.coeff(0);
	X.coeffRef(0,1) = result.coeff(1);
	X.coeffRef(1,0) = result.coeff(2);
	X.coeffRef(1,1) = result.coeff(3);
	}

	// similar to compute1x1offDiagonalBlock()
	template <typename MatrixType, typename ResultType>
	void matrix_sqrt_quasi_triangular_2x2_off_diagonal_block(const MatrixType& T, Index i, Index j, ResultType& sqrtT)
	{
	typedef typename traits<MatrixType>::Scalar Scalar;
	Matrix<Scalar,2,2> A = sqrtT.template block<2,2>(i,i);
	Matrix<Scalar,2,2> B = sqrtT.template block<2,2>(j,j);
	Matrix<Scalar,2,2> C = T.template block<2,2>(i,j);
	if (j-i > 2)
	C -= sqrtT.block(i, i+2, 2, j-i-2) * sqrtT.block(i+2, j, j-i-2, 2);
	Matrix<Scalar,2,2> X;
	matrix_sqrt_quasi_triangular_solve_auxiliary_equation(X, A, B, C);
	sqrtT.template block<2,2>(i,j) = X;
	}

	// pre: T is quasi-upper-triangular and sqrtT is a zero matrix of the same size
	// post: the diagonal blocks of sqrtT are the square roots of the diagonal blocks of T
	template <typename MatrixType, typename ResultType>
	void matrix_sqrt_quasi_triangular_diagonal(const MatrixType& T, ResultType& sqrtT)
	{
	using std::sqrt;
	const Index size = T.rows();
	for (Index i = 0; i < size; i++) {
	if (i == size - 1 \|\| T.coeff(i+1, i) == 0) {
	eigen_assert(T(i,i) >= 0);
	sqrtT.coeffRef(i,i) = sqrt(T.coeff(i,i));
	}
	else {
	matrix_sqrt_quasi_triangular_2x2_diagonal_block(T, i, sqrtT);
	++i;
	}
	}
	}

	// pre: T is quasi-upper-triangular and diagonal blocks of sqrtT are square root of diagonal blocks of T.
	// post: sqrtT is the square root of T.
	template <typename MatrixType, typename ResultType>
	void matrix_sqrt_quasi_triangular_off_diagonal(const MatrixType& T, ResultType& sqrtT)
	{
	const Index size = T.rows();
	for (Index j = 1; j < size; j++) {
	if (T.coeff(j, j-1) != 0) // if T(j-1:j, j-1:j) is a 2-by-2 block
	continue;
	for (Index i = j-1; i >= 0; i--) {
	if (i > 0 && T.coeff(i, i-1) != 0) // if T(i-1:i, i-1:i) is a 2-by-2 block
	continue;
	bool iBlockIs2x2 = (i < size - 1) && (T.coeff(i+1, i) != 0);
	bool jBlockIs2x2 = (j < size - 1) && (T.coeff(j+1, j) != 0);
	if (iBlockIs2x2 && jBlockIs2x2)
	matrix_sqrt_quasi_triangular_2x2_off_diagonal_block(T, i, j, sqrtT);
	else if (iBlockIs2x2 && !jBlockIs2x2)
	matrix_sqrt_quasi_triangular_2x1_off_diagonal_block(T, i, j, sqrtT);
	else if (!iBlockIs2x2 && jBlockIs2x2)
	matrix_sqrt_quasi_triangular_1x2_off_diagonal_block(T, i, j, sqrtT);
	else if (!iBlockIs2x2 && !jBlockIs2x2)
	matrix_sqrt_quasi_triangular_1x1_off_diagonal_block(T, i, j, sqrtT);
	}
	}
	}

	} // end of namespace internal

	/** \ingroup MatrixFunctions_Module
	* \brief Compute matrix square root of quasi-triangular matrix.
	*
	* \tparam MatrixType type of \p arg, the argument of matrix square root,
	* expected to be an instantiation of the Matrix class template.
	* \tparam ResultType type of \p result, where result is to be stored.
	* \param[in] arg argument of matrix square root.
	* \param[out] result matrix square root of upper Hessenberg part of \p arg.
	*
	* This function computes the square root of the upper quasi-triangular matrix stored in the upper
	* Hessenberg part of \p arg. Only the upper Hessenberg part of \p result is updated, the rest is
	* not touched. See MatrixBase::sqrt() for details on how this computation is implemented.
	*
	* \sa MatrixSquareRoot, MatrixSquareRootQuasiTriangular
	*/
	template <typename MatrixType, typename ResultType>
	void matrix_sqrt_quasi_triangular(const MatrixType &arg, ResultType &result)
	{
	eigen_assert(arg.rows() == arg.cols());
	result.resize(arg.rows(), arg.cols());
	internal::matrix_sqrt_quasi_triangular_diagonal(arg, result);
	internal::matrix_sqrt_quasi_triangular_off_diagonal(arg, result);
	}


	/** \ingroup MatrixFunctions_Module
	* \brief Compute matrix square root of triangular matrix.
	*
	* \tparam MatrixType type of \p arg, the argument of matrix square root,
	* expected to be an instantiation of the Matrix class template.
	* \tparam ResultType type of \p result, where result is to be stored.
	* \param[in] arg argument of matrix square root.
	* \param[out] result matrix square root of upper triangular part of \p arg.
	*
	* Only the upper triangular part (including the diagonal) of \p result is updated, the rest is not
	* touched. See MatrixBase::sqrt() for details on how this computation is implemented.
	*
	* \sa MatrixSquareRoot, MatrixSquareRootQuasiTriangular
	*/
	template <typename MatrixType, typename ResultType>
	void matrix_sqrt_triangular(const MatrixType &arg, ResultType &result)
	{
	using std::sqrt;
	typedef typename MatrixType::Scalar Scalar;

	eigen_assert(arg.rows() == arg.cols());

	// Compute square root of arg and store it in upper triangular part of result
	// This uses that the square root of triangular matrices can be computed directly.
	result.resize(arg.rows(), arg.cols());
	for (Index i = 0; i < arg.rows(); i++) {
	result.coeffRef(i,i) = sqrt(arg.coeff(i,i));
	}
	for (Index j = 1; j < arg.cols(); j++) {
	for (Index i = j-1; i >= 0; i--) {
	// if i = j-1, then segment has length 0 so tmp = 0
	Scalar tmp = (result.row(i).segment(i+1,j-i-1) * result.col(j).segment(i+1,j-i-1)).value();
	// denominator may be zero if original matrix is singular
	result.coeffRef(i,j) = (arg.coeff(i,j) - tmp) / (result.coeff(i,i) + result.coeff(j,j));
	}
	}
	}


	namespace internal {

	/** \ingroup MatrixFunctions_Module
	* \brief Helper struct for computing matrix square roots of general matrices.
	* \tparam MatrixType type of the argument of the matrix square root,
	* expected to be an instantiation of the Matrix class template.
	*
	* \sa MatrixSquareRootTriangular, MatrixSquareRootQuasiTriangular, MatrixBase::sqrt()
	*/
	template <typename MatrixType, int IsComplex = NumTraits<typename internal::traits<MatrixType>::Scalar>::IsComplex>
	struct matrix_sqrt_compute
	{
	/** \brief Compute the matrix square root
	*
	* \param[in] arg matrix whose square root is to be computed.
	* \param[out] result square root of \p arg.
	*
	* See MatrixBase::sqrt() for details on how this computation is implemented.
	*/
	template <typename ResultType> static void run(const MatrixType &arg, ResultType &result);
	};


	// ******** Partial specialization for real matrices ********

	template <typename MatrixType>
	struct matrix_sqrt_compute<MatrixType, 0>
	{
	template <typename ResultType>
	static void run(const MatrixType &arg, ResultType &result)
	{
	eigen_assert(arg.rows() == arg.cols());

	// Compute Schur decomposition of arg
	const RealSchur<MatrixType> schurOfA(arg);
	const MatrixType& T = schurOfA.matrixT();
	const MatrixType& U = schurOfA.matrixU();

	// Compute square root of T
	MatrixType sqrtT = MatrixType::Zero(arg.rows(), arg.cols());
	matrix_sqrt_quasi_triangular(T, sqrtT);

	// Compute square root of arg
	result = U * sqrtT * U.adjoint();
	}
	};


	// ******** Partial specialization for complex matrices ********

	template <typename MatrixType>
	struct matrix_sqrt_compute<MatrixType, 1>
	{
	template <typename ResultType>
	static void run(const MatrixType &arg, ResultType &result)
	{
	eigen_assert(arg.rows() == arg.cols());

	// Compute Schur decomposition of arg
	const ComplexSchur<MatrixType> schurOfA(arg);
	const MatrixType& T = schurOfA.matrixT();
	const MatrixType& U = schurOfA.matrixU();

	// Compute square root of T
	MatrixType sqrtT;
	matrix_sqrt_triangular(T, sqrtT);

	// Compute square root of arg
	result = U * (sqrtT.template triangularView<Upper>() * U.adjoint());
	}
	};

	} // end namespace internal

	/** \ingroup MatrixFunctions_Module
	*
	* \brief Proxy for the matrix square root of some matrix (expression).
	*
	* \tparam Derived Type of the argument to the matrix square root.
	*
	* This class holds the argument to the matrix square root until it
	* is assigned or evaluated for some other reason (so the argument
	* should not be changed in the meantime). It is the return type of
	* MatrixBase::sqrt() and most of the time this is the only way it is
	* used.
	*/
	template<typename Derived> class MatrixSquareRootReturnValue
	: public ReturnByValue<MatrixSquareRootReturnValue<Derived> >
	{
	protected:
	typedef typename internal::ref_selector<Derived>::type DerivedNested;

	public:
	/** \brief Constructor.
	*
	* \param[in] src %Matrix (expression) forming the argument of the
	* matrix square root.
	*/
	explicit MatrixSquareRootReturnValue(const Derived& src) : m_src(src) { }

	/** \brief Compute the matrix square root.
	*
	* \param[out] result the matrix square root of \p src in the
	* constructor.
	*/
	template <typename ResultType>
	inline void evalTo(ResultType& result) const
	{
	typedef typename internal::nested_eval<Derived, 10>::type DerivedEvalType;
	typedef typename internal::remove_all<DerivedEvalType>::type DerivedEvalTypeClean;
	DerivedEvalType tmp(m_src);
	internal::matrix_sqrt_compute<DerivedEvalTypeClean>::run(tmp, result);
	}

	Index rows() const { return m_src.rows(); }
	Index cols() const { return m_src.cols(); }

	protected:
	const DerivedNested m_src;
	};

	namespace internal {
	template<typename Derived>
	struct traits<MatrixSquareRootReturnValue<Derived> >
	{
	typedef typename Derived::PlainObject ReturnType;
	};
	}

	template <typename Derived>
	const MatrixSquareRootReturnValue<Derived> MatrixBase<Derived>::sqrt() const
	{
	eigen_assert(rows() == cols());
	return MatrixSquareRootReturnValue<Derived>(derived());
	}

	} // end namespace Eigen

	#endif // EIGEN_MATRIX_FUNCTION