Eigen/src/Jacobi/Jacobi.h - eigen/fuchsia - Git at Google

 // This file is part of Eigen, a lightweight C++ template library
 // for linear algebra.
 //
 // Copyright (C) 2009 Benoit Jacob <jacob.benoit.1@gmail.com>
 // 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_JACOBI_H
 #define EIGEN_JACOBI_H

 namespace Eigen {

 /** \ingroup Jacobi_Module
   * \jacobi_module
   * \class JacobiRotation
   * \brief Rotation given by a cosine-sine pair.
   *
   * This class represents a Jacobi or Givens rotation.
   * This is a 2D rotation in the plane \c J of angle \f$ \theta \f$ defined by
   * its cosine \c c and sine \c s as follow:
   * \f$ J = \left ( \begin{array}{cc} c & \overline s \\ -s  & \overline c \end{array} \right ) \f$
   *
   * You can apply the respective counter-clockwise rotation to a column vector \c v by
   * applying its adjoint on the left: \f$ v = J^* v \f$ that translates to the following Eigen code:
   * \code
   * v.applyOnTheLeft(J.adjoint());
   * \endcode
   *
   * \sa MatrixBase::applyOnTheLeft(), MatrixBase::applyOnTheRight()
   */
 template<typename Scalar> class JacobiRotation
 {
   public:
     typedef typename NumTraits<Scalar>::Real RealScalar;

     /** Default constructor without any initialization. */
     JacobiRotation() {}

     /** Construct a planar rotation from a cosine-sine pair (\a c, \c s). */
     JacobiRotation(const Scalar& c, const Scalar& s) : m_c(c), m_s(s) {}

     Scalar& c() { return m_c; }
     Scalar c() const { return m_c; }
     Scalar& s() { return m_s; }
     Scalar s() const { return m_s; }

     /** Concatenates two planar rotation */
     JacobiRotation operator*(const JacobiRotation& other)
     {
       using numext::conj;
       return JacobiRotation(m_c * other.m_c - conj(m_s) * other.m_s,
                             conj(m_c * conj(other.m_s) + conj(m_s) * conj(other.m_c)));
     }

     /** Returns the transposed transformation */
     JacobiRotation transpose() const { using numext::conj; return JacobiRotation(m_c, -conj(m_s)); }

     /** Returns the adjoint transformation */
     JacobiRotation adjoint() const { using numext::conj; return JacobiRotation(conj(m_c), -m_s); }

     template<typename Derived>
     bool makeJacobi(const MatrixBase<Derived>&, typename Derived::Index p, typename Derived::Index q);
     bool makeJacobi(const RealScalar& x, const Scalar& y, const RealScalar& z);

     void makeGivens(const Scalar& p, const Scalar& q, Scalar* z=0);

   protected:
     void makeGivens(const Scalar& p, const Scalar& q, Scalar* z, internal::true_type);
     void makeGivens(const Scalar& p, const Scalar& q, Scalar* z, internal::false_type);

     Scalar m_c, m_s;
 };

 /** Makes \c *this as a Jacobi rotation \a J such that applying \a J on both the right and left sides of the selfadjoint 2x2 matrix
   * \f$ B = \left ( \begin{array}{cc} x & y \\ \overline y & z \end{array} \right )\f$ yields a diagonal matrix \f$ A = J^* B J \f$
   *
   * \sa MatrixBase::makeJacobi(const MatrixBase<Derived>&, Index, Index), MatrixBase::applyOnTheLeft(), MatrixBase::applyOnTheRight()
   */
 template<typename Scalar>
 bool JacobiRotation<Scalar>::makeJacobi(const RealScalar& x, const Scalar& y, const RealScalar& z)
 {
   using std::sqrt;
   using std::abs;
   typedef typename NumTraits<Scalar>::Real RealScalar;
   if(y == Scalar(0))
   {
     m_c = Scalar(1);
     m_s = Scalar(0);
     return false;
   }
   else
   {
     RealScalar tau = (x-z)/(RealScalar(2)*abs(y));
     RealScalar w = sqrt(numext::abs2(tau) + RealScalar(1));
     RealScalar t;
     if(tau>RealScalar(0))
     {
       t = RealScalar(1) / (tau + w);
     }
     else
     {
       t = RealScalar(1) / (tau - w);
     }
     RealScalar sign_t = t > RealScalar(0) ? RealScalar(1) : RealScalar(-1);
     RealScalar n = RealScalar(1) / sqrt(numext::abs2(t)+RealScalar(1));
     m_s = - sign_t * (numext::conj(y) / abs(y)) * abs(t) * n;
     m_c = n;
     return true;
   }
 }

 /** Makes \c *this as a Jacobi rotation \c J such that applying \a J on both the right and left sides of the 2x2 selfadjoint matrix
   * \f$ B = \left ( \begin{array}{cc} \text{this}_{pp} & \text{this}_{pq} \\ (\text{this}_{pq})^* & \text{this}_{qq} \end{array} \right )\f$ yields
   * a diagonal matrix \f$ A = J^* B J \f$
   *
   * Example: \include Jacobi_makeJacobi.cpp
   * Output: \verbinclude Jacobi_makeJacobi.out
   *
   * \sa JacobiRotation::makeJacobi(RealScalar, Scalar, RealScalar), MatrixBase::applyOnTheLeft(), MatrixBase::applyOnTheRight()
   */
 template<typename Scalar>
 template<typename Derived>
 inline bool JacobiRotation<Scalar>::makeJacobi(const MatrixBase<Derived>& m, typename Derived::Index p, typename Derived::Index q)
 {
   return makeJacobi(numext::real(m.coeff(p,p)), m.coeff(p,q), numext::real(m.coeff(q,q)));
 }

 /** Makes \c *this as a Givens rotation \c G such that applying \f$ G^* \f$ to the left of the vector
   * \f$ V = \left ( \begin{array}{c} p \\ q \end{array} \right )\f$ yields:
   * \f$ G^* V = \left ( \begin{array}{c} r \\ 0 \end{array} \right )\f$.
   *
   * The value of \a z is returned if \a z is not null (the default is null).
   * Also note that G is built such that the cosine is always real.
   *
   * Example: \include Jacobi_makeGivens.cpp
   * Output: \verbinclude Jacobi_makeGivens.out
   *
   * This function implements the continuous Givens rotation generation algorithm
   * found in Anderson (2000), Discontinuous Plane Rotations and the Symmetric Eigenvalue Problem.
   * LAPACK Working Note 150, University of Tennessee, UT-CS-00-454, December 4, 2000.
   *
   * \sa MatrixBase::applyOnTheLeft(), MatrixBase::applyOnTheRight()
   */
 template<typename Scalar>
 void JacobiRotation<Scalar>::makeGivens(const Scalar& p, const Scalar& q, Scalar* z)
 {
   makeGivens(p, q, z, typename internal::conditional<NumTraits<Scalar>::IsComplex, internal::true_type, internal::false_type>::type());
 }


 // specialization for complexes
 template<typename Scalar>
 void JacobiRotation<Scalar>::makeGivens(const Scalar& p, const Scalar& q, Scalar* r, internal::true_type)
 {
   using std::sqrt;
   using std::abs;
   using numext::conj;

   if(q==Scalar(0))
   {
     m_c = numext::real(p)<0 ? Scalar(-1) : Scalar(1);
     m_s = 0;
     if(r) *r = m_c * p;
   }
   else if(p==Scalar(0))
   {
     m_c = 0;
     m_s = -q/abs(q);
     if(r) *r = abs(q);
   }
   else
   {
     RealScalar p1 = numext::norm1(p);
     RealScalar q1 = numext::norm1(q);
     if(p1>=q1)
     {
       Scalar ps = p / p1;
       RealScalar p2 = numext::abs2(ps);
       Scalar qs = q / p1;
       RealScalar q2 = numext::abs2(qs);

       RealScalar u = sqrt(RealScalar(1) + q2/p2);
       if(numext::real(p)<RealScalar(0))
         u = -u;

       m_c = Scalar(1)/u;
       m_s = -qs*conj(ps)*(m_c/p2);
       if(r) *r = p * u;
     }
     else
     {
       Scalar ps = p / q1;
       RealScalar p2 = numext::abs2(ps);
       Scalar qs = q / q1;
       RealScalar q2 = numext::abs2(qs);

       RealScalar u = q1 * sqrt(p2 + q2);
       if(numext::real(p)<RealScalar(0))
         u = -u;

       p1 = abs(p);
       ps = p/p1;
       m_c = p1/u;
       m_s = -conj(ps) * (q/u);
       if(r) *r = ps * u;
     }
   }
 }

 // specialization for reals
 template<typename Scalar>
 void JacobiRotation<Scalar>::makeGivens(const Scalar& p, const Scalar& q, Scalar* r, internal::false_type)
 {
   using std::sqrt;
   using std::abs;
   if(q==Scalar(0))
   {
     m_c = p<Scalar(0) ? Scalar(-1) : Scalar(1);
     m_s = Scalar(0);
     if(r) *r = abs(p);
   }
   else if(p==Scalar(0))
   {
     m_c = Scalar(0);
     m_s = q<Scalar(0) ? Scalar(1) : Scalar(-1);
     if(r) *r = abs(q);
   }
   else if(abs(p) > abs(q))
   {
     Scalar t = q/p;
     Scalar u = sqrt(Scalar(1) + numext::abs2(t));
     if(p<Scalar(0))
       u = -u;
     m_c = Scalar(1)/u;
     m_s = -t * m_c;
     if(r) *r = p * u;
   }
   else
   {
     Scalar t = p/q;
     Scalar u = sqrt(Scalar(1) + numext::abs2(t));
     if(q<Scalar(0))
       u = -u;
     m_s = -Scalar(1)/u;
     m_c = -t * m_s;
     if(r) *r = q * u;
   }

 }

 /****************************************************************************************
 *   Implementation of MatrixBase methods
 ****************************************************************************************/

 /** \jacobi_module
   * Applies the clock wise 2D rotation \a j to the set of 2D vectors of cordinates \a x and \a y:
   * \f$ \left ( \begin{array}{cc} x \\ y \end{array} \right )  =  J \left ( \begin{array}{cc} x \\ y \end{array} \right ) \f$
   *
   * \sa MatrixBase::applyOnTheLeft(), MatrixBase::applyOnTheRight()
   */
 namespace internal {
 template<typename VectorX, typename VectorY, typename OtherScalar>
 void apply_rotation_in_the_plane(VectorX& _x, VectorY& _y, const JacobiRotation<OtherScalar>& j);
 }

 /** \jacobi_module
   * Applies the rotation in the plane \a j to the rows \a p and \a q of \c *this, i.e., it computes B = J * B,
   * with \f$ B = \left ( \begin{array}{cc} \text{*this.row}(p) \\ \text{*this.row}(q) \end{array} \right ) \f$.
   *
   * \sa class JacobiRotation, MatrixBase::applyOnTheRight(), internal::apply_rotation_in_the_plane()
   */
 template<typename Derived>
 template<typename OtherScalar>
 inline void MatrixBase<Derived>::applyOnTheLeft(Index p, Index q, const JacobiRotation<OtherScalar>& j)
 {
   RowXpr x(this->row(p));
   RowXpr y(this->row(q));
   internal::apply_rotation_in_the_plane(x, y, j);
 }

 /** \ingroup Jacobi_Module
   * Applies the rotation in the plane \a j to the columns \a p and \a q of \c *this, i.e., it computes B = B * J
   * with \f$ B = \left ( \begin{array}{cc} \text{*this.col}(p) & \text{*this.col}(q) \end{array} \right ) \f$.
   *
   * \sa class JacobiRotation, MatrixBase::applyOnTheLeft(), internal::apply_rotation_in_the_plane()
   */
 template<typename Derived>
 template<typename OtherScalar>
 inline void MatrixBase<Derived>::applyOnTheRight(Index p, Index q, const JacobiRotation<OtherScalar>& j)
 {
   ColXpr x(this->col(p));
   ColXpr y(this->col(q));
   internal::apply_rotation_in_the_plane(x, y, j.transpose());
 }

 namespace internal {
 template<typename VectorX, typename VectorY, typename OtherScalar>
 void /*EIGEN_DONT_INLINE*/ apply_rotation_in_the_plane(VectorX& _x, VectorY& _y, const JacobiRotation<OtherScalar>& j)
 {
   typedef typename VectorX::Index Index;
   typedef typename VectorX::Scalar Scalar;
   enum { PacketSize = packet_traits<Scalar>::size };
   typedef typename packet_traits<Scalar>::type Packet;
   eigen_assert(_x.size() == _y.size());
   Index size = _x.size();
   Index incrx = _x.innerStride();
   Index incry = _y.innerStride();

   Scalar* EIGEN_RESTRICT x = &_x.coeffRef(0);
   Scalar* EIGEN_RESTRICT y = &_y.coeffRef(0);

   OtherScalar c = j.c();
   OtherScalar s = j.s();
   if (c==OtherScalar(1) && s==OtherScalar(0))
     return;

   /*** dynamic-size vectorized paths ***/

   if(VectorX::SizeAtCompileTime == Dynamic &&
     (VectorX::Flags & VectorY::Flags & PacketAccessBit) &&
     ((incrx==1 && incry==1) || PacketSize == 1))
   {
     // both vectors are sequentially stored in memory => vectorization
     enum { Peeling = 2 };

     Index alignedStart = internal::first_aligned(y, size);
     Index alignedEnd = alignedStart + ((size-alignedStart)/PacketSize)*PacketSize;

     const Packet pc = pset1<Packet>(c);
     const Packet ps = pset1<Packet>(s);
     conj_helper<Packet,Packet,NumTraits<Scalar>::IsComplex,false> pcj;

     for(Index i=0; i<alignedStart; ++i)
     {
       Scalar xi = x[i];
       Scalar yi = y[i];
       x[i] =  c * xi + numext::conj(s) * yi;
       y[i] = -s * xi + numext::conj(c) * yi;
     }

     Scalar* EIGEN_RESTRICT px = x + alignedStart;
     Scalar* EIGEN_RESTRICT py = y + alignedStart;

     if(internal::first_aligned(x, size)==alignedStart)
     {
       for(Index i=alignedStart; i<alignedEnd; i+=PacketSize)
       {
         Packet xi = pload<Packet>(px);
         Packet yi = pload<Packet>(py);
         pstore(px, padd(pmul(pc,xi),pcj.pmul(ps,yi)));
         pstore(py, psub(pcj.pmul(pc,yi),pmul(ps,xi)));
         px += PacketSize;
         py += PacketSize;
       }
     }
     else
     {
       Index peelingEnd = alignedStart + ((size-alignedStart)/(Peeling*PacketSize))*(Peeling*PacketSize);
       for(Index i=alignedStart; i<peelingEnd; i+=Peeling*PacketSize)
       {
         Packet xi   = ploadu<Packet>(px);
         Packet xi1  = ploadu<Packet>(px+PacketSize);
         Packet yi   = pload <Packet>(py);
         Packet yi1  = pload <Packet>(py+PacketSize);
         pstoreu(px, padd(pmul(pc,xi),pcj.pmul(ps,yi)));
         pstoreu(px+PacketSize, padd(pmul(pc,xi1),pcj.pmul(ps,yi1)));
         pstore (py, psub(pcj.pmul(pc,yi),pmul(ps,xi)));
         pstore (py+PacketSize, psub(pcj.pmul(pc,yi1),pmul(ps,xi1)));
         px += Peeling*PacketSize;
         py += Peeling*PacketSize;
       }
       if(alignedEnd!=peelingEnd)
       {
         Packet xi = ploadu<Packet>(x+peelingEnd);
         Packet yi = pload <Packet>(y+peelingEnd);
         pstoreu(x+peelingEnd, padd(pmul(pc,xi),pcj.pmul(ps,yi)));
         pstore (y+peelingEnd, psub(pcj.pmul(pc,yi),pmul(ps,xi)));
       }
     }

     for(Index i=alignedEnd; i<size; ++i)
     {
       Scalar xi = x[i];
       Scalar yi = y[i];
       x[i] =  c * xi + numext::conj(s) * yi;
       y[i] = -s * xi + numext::conj(c) * yi;
     }
   }

   /*** fixed-size vectorized path ***/
   else if(VectorX::SizeAtCompileTime != Dynamic &&
           (VectorX::Flags & VectorY::Flags & PacketAccessBit) &&
           (VectorX::Flags & VectorY::Flags & AlignedBit))
   {
     const Packet pc = pset1<Packet>(c);
     const Packet ps = pset1<Packet>(s);
     conj_helper<Packet,Packet,NumTraits<Scalar>::IsComplex,false> pcj;
     Scalar* EIGEN_RESTRICT px = x;
     Scalar* EIGEN_RESTRICT py = y;
     for(Index i=0; i<size; i+=PacketSize)
     {
       Packet xi = pload<Packet>(px);
       Packet yi = pload<Packet>(py);
       pstore(px, padd(pmul(pc,xi),pcj.pmul(ps,yi)));
       pstore(py, psub(pcj.pmul(pc,yi),pmul(ps,xi)));
       px += PacketSize;
       py += PacketSize;
     }
   }

   /*** non-vectorized path ***/
   else
   {
     for(Index i=0; i<size; ++i)
     {
       Scalar xi = *x;
       Scalar yi = *y;
       *x =  c * xi + numext::conj(s) * yi;
       *y = -s * xi + numext::conj(c) * yi;
       x += incrx;
       y += incry;
     }
   }
 }

 } // end namespace internal

 } // end namespace Eigen

 #endif // EIGEN_JACOBI_H
	// This file is part of Eigen, a lightweight C++ template library
	// for linear algebra.
	//
	// Copyright (C) 2009 Benoit Jacob <jacob.benoit.1@gmail.com>
	// 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_JACOBI_H
	#define EIGEN_JACOBI_H

	namespace Eigen {

	/** \ingroup Jacobi_Module
	* \jacobi_module
	* \class JacobiRotation
	* \brief Rotation given by a cosine-sine pair.
	*
	* This class represents a Jacobi or Givens rotation.
	* This is a 2D rotation in the plane \c J of angle \f$ \theta \f$ defined by
	* its cosine \c c and sine \c s as follow:
	* \f$ J = \left ( \begin{array}{cc} c & \overline s \\ -s & \overline c \end{array} \right ) \f$
	*
	* You can apply the respective counter-clockwise rotation to a column vector \c v by
	* applying its adjoint on the left: \f$ v = J^* v \f$ that translates to the following Eigen code:
	* \code
	* v.applyOnTheLeft(J.adjoint());
	* \endcode
	*
	* \sa MatrixBase::applyOnTheLeft(), MatrixBase::applyOnTheRight()
	*/
	template<typename Scalar> class JacobiRotation
	{
	public:
	typedef typename NumTraits<Scalar>::Real RealScalar;

	/** Default constructor without any initialization. */
	JacobiRotation() {}

	/** Construct a planar rotation from a cosine-sine pair (\a c, \c s). */
	JacobiRotation(const Scalar& c, const Scalar& s) : m_c(c), m_s(s) {}

	Scalar& c() { return m_c; }
	Scalar c() const { return m_c; }
	Scalar& s() { return m_s; }
	Scalar s() const { return m_s; }

	/** Concatenates two planar rotation */
	JacobiRotation operator*(const JacobiRotation& other)
	{
	using numext::conj;
	return JacobiRotation(m_c * other.m_c - conj(m_s) * other.m_s,
	conj(m_c * conj(other.m_s) + conj(m_s) * conj(other.m_c)));
	}

	/** Returns the transposed transformation */
	JacobiRotation transpose() const { using numext::conj; return JacobiRotation(m_c, -conj(m_s)); }

	/** Returns the adjoint transformation */
	JacobiRotation adjoint() const { using numext::conj; return JacobiRotation(conj(m_c), -m_s); }

	template<typename Derived>
	bool makeJacobi(const MatrixBase<Derived>&, typename Derived::Index p, typename Derived::Index q);
	bool makeJacobi(const RealScalar& x, const Scalar& y, const RealScalar& z);

	void makeGivens(const Scalar& p, const Scalar& q, Scalar* z=0);

	protected:
	void makeGivens(const Scalar& p, const Scalar& q, Scalar* z, internal::true_type);
	void makeGivens(const Scalar& p, const Scalar& q, Scalar* z, internal::false_type);

	Scalar m_c, m_s;
	};

	/** Makes \c *this as a Jacobi rotation \a J such that applying \a J on both the right and left sides of the selfadjoint 2x2 matrix
	* \f$ B = \left ( \begin{array}{cc} x & y \\ \overline y & z \end{array} \right )\f$ yields a diagonal matrix \f$ A = J^* B J \f$
	*
	* \sa MatrixBase::makeJacobi(const MatrixBase<Derived>&, Index, Index), MatrixBase::applyOnTheLeft(), MatrixBase::applyOnTheRight()
	*/
	template<typename Scalar>
	bool JacobiRotation<Scalar>::makeJacobi(const RealScalar& x, const Scalar& y, const RealScalar& z)
	{
	using std::sqrt;
	using std::abs;
	typedef typename NumTraits<Scalar>::Real RealScalar;
	if(y == Scalar(0))
	{
	m_c = Scalar(1);
	m_s = Scalar(0);
	return false;
	}
	else
	{
	RealScalar tau = (x-z)/(RealScalar(2)*abs(y));
	RealScalar w = sqrt(numext::abs2(tau) + RealScalar(1));
	RealScalar t;
	if(tau>RealScalar(0))
	{
	t = RealScalar(1) / (tau + w);
	}
	else
	{
	t = RealScalar(1) / (tau - w);
	}
	RealScalar sign_t = t > RealScalar(0) ? RealScalar(1) : RealScalar(-1);
	RealScalar n = RealScalar(1) / sqrt(numext::abs2(t)+RealScalar(1));
	m_s = - sign_t * (numext::conj(y) / abs(y)) * abs(t) * n;
	m_c = n;
	return true;
	}
	}

	/** Makes \c *this as a Jacobi rotation \c J such that applying \a J on both the right and left sides of the 2x2 selfadjoint matrix
	* \f$ B = \left ( \begin{array}{cc} \text{this}_{pp} & \text{this}_{pq} \\ (\text{this}_{pq})^* & \text{this}_{qq} \end{array} \right )\f$ yields
	* a diagonal matrix \f$ A = J^* B J \f$
	*
	* Example: \include Jacobi_makeJacobi.cpp
	* Output: \verbinclude Jacobi_makeJacobi.out
	*
	* \sa JacobiRotation::makeJacobi(RealScalar, Scalar, RealScalar), MatrixBase::applyOnTheLeft(), MatrixBase::applyOnTheRight()
	*/
	template<typename Scalar>
	template<typename Derived>
	inline bool JacobiRotation<Scalar>::makeJacobi(const MatrixBase<Derived>& m, typename Derived::Index p, typename Derived::Index q)
	{
	return makeJacobi(numext::real(m.coeff(p,p)), m.coeff(p,q), numext::real(m.coeff(q,q)));
	}

	/** Makes \c this as a Givens rotation \c G such that applying \f$ G^ \f$ to the left of the vector
	* \f$ V = \left ( \begin{array}{c} p \\ q \end{array} \right )\f$ yields:
	* \f$ G^* V = \left ( \begin{array}{c} r \\ 0 \end{array} \right )\f$.
	*
	* The value of \a z is returned if \a z is not null (the default is null).
	* Also note that G is built such that the cosine is always real.
	*
	* Example: \include Jacobi_makeGivens.cpp
	* Output: \verbinclude Jacobi_makeGivens.out
	*
	* This function implements the continuous Givens rotation generation algorithm
	* found in Anderson (2000), Discontinuous Plane Rotations and the Symmetric Eigenvalue Problem.
	* LAPACK Working Note 150, University of Tennessee, UT-CS-00-454, December 4, 2000.
	*
	* \sa MatrixBase::applyOnTheLeft(), MatrixBase::applyOnTheRight()
	*/
	template<typename Scalar>
	void JacobiRotation<Scalar>::makeGivens(const Scalar& p, const Scalar& q, Scalar* z)
	{
	makeGivens(p, q, z, typename internal::conditional<NumTraits<Scalar>::IsComplex, internal::true_type, internal::false_type>::type());
	}


	// specialization for complexes
	template<typename Scalar>
	void JacobiRotation<Scalar>::makeGivens(const Scalar& p, const Scalar& q, Scalar* r, internal::true_type)
	{
	using std::sqrt;
	using std::abs;
	using numext::conj;

	if(q==Scalar(0))
	{
	m_c = numext::real(p)<0 ? Scalar(-1) : Scalar(1);
	m_s = 0;
	if(r) r = m_c p;
	}
	else if(p==Scalar(0))
	{
	m_c = 0;
	m_s = -q/abs(q);
	if(r) *r = abs(q);
	}
	else
	{
	RealScalar p1 = numext::norm1(p);
	RealScalar q1 = numext::norm1(q);
	if(p1>=q1)
	{
	Scalar ps = p / p1;
	RealScalar p2 = numext::abs2(ps);
	Scalar qs = q / p1;
	RealScalar q2 = numext::abs2(qs);

	RealScalar u = sqrt(RealScalar(1) + q2/p2);
	if(numext::real(p)<RealScalar(0))
	u = -u;

	m_c = Scalar(1)/u;
	m_s = -qsconj(ps)(m_c/p2);
	if(r) r = p u;
	}
	else
	{
	Scalar ps = p / q1;
	RealScalar p2 = numext::abs2(ps);
	Scalar qs = q / q1;
	RealScalar q2 = numext::abs2(qs);

	RealScalar u = q1 * sqrt(p2 + q2);
	if(numext::real(p)<RealScalar(0))
	u = -u;

	p1 = abs(p);
	ps = p/p1;
	m_c = p1/u;
	m_s = -conj(ps) * (q/u);
	if(r) r = ps u;
	}
	}
	}

	// specialization for reals
	template<typename Scalar>
	void JacobiRotation<Scalar>::makeGivens(const Scalar& p, const Scalar& q, Scalar* r, internal::false_type)
	{
	using std::sqrt;
	using std::abs;
	if(q==Scalar(0))
	{
	m_c = p<Scalar(0) ? Scalar(-1) : Scalar(1);
	m_s = Scalar(0);
	if(r) *r = abs(p);
	}
	else if(p==Scalar(0))
	{
	m_c = Scalar(0);
	m_s = q<Scalar(0) ? Scalar(1) : Scalar(-1);
	if(r) *r = abs(q);
	}
	else if(abs(p) > abs(q))
	{
	Scalar t = q/p;
	Scalar u = sqrt(Scalar(1) + numext::abs2(t));
	if(p<Scalar(0))
	u = -u;
	m_c = Scalar(1)/u;
	m_s = -t * m_c;
	if(r) r = p u;
	}
	else
	{
	Scalar t = p/q;
	Scalar u = sqrt(Scalar(1) + numext::abs2(t));
	if(q<Scalar(0))
	u = -u;
	m_s = -Scalar(1)/u;
	m_c = -t * m_s;
	if(r) r = q u;
	}

	}

	/****************************************************************************************
	* Implementation of MatrixBase methods
	****************************************************************************************/

	/** \jacobi_module
	* Applies the clock wise 2D rotation \a j to the set of 2D vectors of cordinates \a x and \a y:
	* \f$ \left ( \begin{array}{cc} x \\ y \end{array} \right ) = J \left ( \begin{array}{cc} x \\ y \end{array} \right ) \f$
	*
	* \sa MatrixBase::applyOnTheLeft(), MatrixBase::applyOnTheRight()
	*/
	namespace internal {
	template<typename VectorX, typename VectorY, typename OtherScalar>
	void apply_rotation_in_the_plane(VectorX& _x, VectorY& _y, const JacobiRotation<OtherScalar>& j);
	}

	/** \jacobi_module
	* Applies the rotation in the plane \a j to the rows \a p and \a q of \c this, i.e., it computes B = J B,
	* with \f$ B = \left ( \begin{array}{cc} \text{this.row}(p) \\ \text{this.row}(q) \end{array} \right ) \f$.
	*
	* \sa class JacobiRotation, MatrixBase::applyOnTheRight(), internal::apply_rotation_in_the_plane()
	*/
	template<typename Derived>
	template<typename OtherScalar>
	inline void MatrixBase<Derived>::applyOnTheLeft(Index p, Index q, const JacobiRotation<OtherScalar>& j)
	{
	RowXpr x(this->row(p));
	RowXpr y(this->row(q));
	internal::apply_rotation_in_the_plane(x, y, j);
	}

	/** \ingroup Jacobi_Module
	* Applies the rotation in the plane \a j to the columns \a p and \a q of \c this, i.e., it computes B = B J
	* with \f$ B = \left ( \begin{array}{cc} \text{this.col}(p) & \text{this.col}(q) \end{array} \right ) \f$.
	*
	* \sa class JacobiRotation, MatrixBase::applyOnTheLeft(), internal::apply_rotation_in_the_plane()
	*/
	template<typename Derived>
	template<typename OtherScalar>
	inline void MatrixBase<Derived>::applyOnTheRight(Index p, Index q, const JacobiRotation<OtherScalar>& j)
	{
	ColXpr x(this->col(p));
	ColXpr y(this->col(q));
	internal::apply_rotation_in_the_plane(x, y, j.transpose());
	}

	namespace internal {
	template<typename VectorX, typename VectorY, typename OtherScalar>
	void /EIGEN_DONT_INLINE/ apply_rotation_in_the_plane(VectorX& _x, VectorY& _y, const JacobiRotation<OtherScalar>& j)
	{
	typedef typename VectorX::Index Index;
	typedef typename VectorX::Scalar Scalar;
	enum { PacketSize = packet_traits<Scalar>::size };
	typedef typename packet_traits<Scalar>::type Packet;
	eigen_assert(_x.size() == _y.size());
	Index size = _x.size();
	Index incrx = _x.innerStride();
	Index incry = _y.innerStride();

	Scalar* EIGEN_RESTRICT x = &_x.coeffRef(0);
	Scalar* EIGEN_RESTRICT y = &_y.coeffRef(0);

	OtherScalar c = j.c();
	OtherScalar s = j.s();
	if (c==OtherScalar(1) && s==OtherScalar(0))
	return;

	/* dynamic-size vectorized paths */

	if(VectorX::SizeAtCompileTime == Dynamic &&
	(VectorX::Flags & VectorY::Flags & PacketAccessBit) &&
	((incrx==1 && incry==1) \|\| PacketSize == 1))
	{
	// both vectors are sequentially stored in memory => vectorization
	enum { Peeling = 2 };

	Index alignedStart = internal::first_aligned(y, size);
	Index alignedEnd = alignedStart + ((size-alignedStart)/PacketSize)*PacketSize;

	const Packet pc = pset1<Packet>(c);
	const Packet ps = pset1<Packet>(s);
	conj_helper<Packet,Packet,NumTraits<Scalar>::IsComplex,false> pcj;

	for(Index i=0; i<alignedStart; ++i)
	{
	Scalar xi = x[i];
	Scalar yi = y[i];
	x[i] = c * xi + numext::conj(s) * yi;
	y[i] = -s * xi + numext::conj(c) * yi;
	}

	Scalar* EIGEN_RESTRICT px = x + alignedStart;
	Scalar* EIGEN_RESTRICT py = y + alignedStart;

	if(internal::first_aligned(x, size)==alignedStart)
	{
	for(Index i=alignedStart; i<alignedEnd; i+=PacketSize)
	{
	Packet xi = pload<Packet>(px);
	Packet yi = pload<Packet>(py);
	pstore(px, padd(pmul(pc,xi),pcj.pmul(ps,yi)));
	pstore(py, psub(pcj.pmul(pc,yi),pmul(ps,xi)));
	px += PacketSize;
	py += PacketSize;
	}
	}
	else
	{
	Index peelingEnd = alignedStart + ((size-alignedStart)/(PeelingPacketSize))(Peeling*PacketSize);
	for(Index i=alignedStart; i<peelingEnd; i+=Peeling*PacketSize)
	{
	Packet xi = ploadu<Packet>(px);
	Packet xi1 = ploadu<Packet>(px+PacketSize);
	Packet yi = pload <Packet>(py);
	Packet yi1 = pload <Packet>(py+PacketSize);
	pstoreu(px, padd(pmul(pc,xi),pcj.pmul(ps,yi)));
	pstoreu(px+PacketSize, padd(pmul(pc,xi1),pcj.pmul(ps,yi1)));
	pstore (py, psub(pcj.pmul(pc,yi),pmul(ps,xi)));
	pstore (py+PacketSize, psub(pcj.pmul(pc,yi1),pmul(ps,xi1)));
	px += Peeling*PacketSize;
	py += Peeling*PacketSize;
	}
	if(alignedEnd!=peelingEnd)
	{
	Packet xi = ploadu<Packet>(x+peelingEnd);
	Packet yi = pload <Packet>(y+peelingEnd);
	pstoreu(x+peelingEnd, padd(pmul(pc,xi),pcj.pmul(ps,yi)));
	pstore (y+peelingEnd, psub(pcj.pmul(pc,yi),pmul(ps,xi)));
	}
	}

	for(Index i=alignedEnd; i<size; ++i)
	{
	Scalar xi = x[i];
	Scalar yi = y[i];
	x[i] = c * xi + numext::conj(s) * yi;
	y[i] = -s * xi + numext::conj(c) * yi;
	}
	}

	/* fixed-size vectorized path */
	else if(VectorX::SizeAtCompileTime != Dynamic &&
	(VectorX::Flags & VectorY::Flags & PacketAccessBit) &&
	(VectorX::Flags & VectorY::Flags & AlignedBit))
	{
	const Packet pc = pset1<Packet>(c);
	const Packet ps = pset1<Packet>(s);
	conj_helper<Packet,Packet,NumTraits<Scalar>::IsComplex,false> pcj;
	Scalar* EIGEN_RESTRICT px = x;
	Scalar* EIGEN_RESTRICT py = y;
	for(Index i=0; i<size; i+=PacketSize)
	{
	Packet xi = pload<Packet>(px);
	Packet yi = pload<Packet>(py);
	pstore(px, padd(pmul(pc,xi),pcj.pmul(ps,yi)));
	pstore(py, psub(pcj.pmul(pc,yi),pmul(ps,xi)));
	px += PacketSize;
	py += PacketSize;
	}
	}

	/* non-vectorized path */
	else
	{
	for(Index i=0; i<size; ++i)
	{
	Scalar xi = *x;
	Scalar yi = *y;
	x = c xi + numext::conj(s) * yi;
	y = -s xi + numext::conj(c) * yi;
	x += incrx;
	y += incry;
	}
	}
	}

	} // end namespace internal

	} // end namespace Eigen

	#endif // EIGEN_JACOBI_H