1c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath// This file is part of Eigen, a lightweight C++ template library
2c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath// for linear algebra.
3c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath//
4c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath// Copyright (C) 2009 Gael Guennebaud <gael.guennebaud@inria.fr>
5c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath// Copyright (C) 2010 Benoit Jacob <jacob.benoit.1@gmail.com>
6c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath//
7c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath// This Source Code Form is subject to the terms of the Mozilla
8c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath// Public License v. 2.0. If a copy of the MPL was not distributed
9c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath// with this file, You can obtain one at http://mozilla.org/MPL/2.0/.
10c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath
11c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath#ifndef EIGEN_HOUSEHOLDER_SEQUENCE_H
12c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath#define EIGEN_HOUSEHOLDER_SEQUENCE_H
13c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath
14c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamathnamespace Eigen {
15c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath
16c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath/** \ingroup Householder_Module
17c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  * \householder_module
18c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  * \class HouseholderSequence
19c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  * \brief Sequence of Householder reflections acting on subspaces with decreasing size
20c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  * \tparam VectorsType type of matrix containing the Householder vectors
21c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  * \tparam CoeffsType  type of vector containing the Householder coefficients
22c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  * \tparam Side        either OnTheLeft (the default) or OnTheRight
23c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  *
24c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  * This class represents a product sequence of Householder reflections where the first Householder reflection
25c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  * acts on the whole space, the second Householder reflection leaves the one-dimensional subspace spanned by
26c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  * the first unit vector invariant, the third Householder reflection leaves the two-dimensional subspace
27c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  * spanned by the first two unit vectors invariant, and so on up to the last reflection which leaves all but
28c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  * one dimensions invariant and acts only on the last dimension. Such sequences of Householder reflections
29c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  * are used in several algorithms to zero out certain parts of a matrix. Indeed, the methods
30c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  * HessenbergDecomposition::matrixQ(), Tridiagonalization::matrixQ(), HouseholderQR::householderQ(),
31c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  * and ColPivHouseholderQR::householderQ() all return a %HouseholderSequence.
32c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  *
33c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  * More precisely, the class %HouseholderSequence represents an \f$ n \times n \f$ matrix \f$ H \f$ of the
34c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  * form \f$ H = \prod_{i=0}^{n-1} H_i \f$ where the i-th Householder reflection is \f$ H_i = I - h_i v_i
35c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  * v_i^* \f$. The i-th Householder coefficient \f$ h_i \f$ is a scalar and the i-th Householder vector \f$
36c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  * v_i \f$ is a vector of the form
37c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  * \f[
38c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  * v_i = [\underbrace{0, \ldots, 0}_{i-1\mbox{ zeros}}, 1, \underbrace{*, \ldots,*}_{n-i\mbox{ arbitrary entries}} ].
39c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  * \f]
40c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  * The last \f$ n-i \f$ entries of \f$ v_i \f$ are called the essential part of the Householder vector.
41c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  *
42c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  * Typical usages are listed below, where H is a HouseholderSequence:
43c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  * \code
44c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  * A.applyOnTheRight(H);             // A = A * H
45c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  * A.applyOnTheLeft(H);              // A = H * A
46c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  * A.applyOnTheRight(H.adjoint());   // A = A * H^*
47c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  * A.applyOnTheLeft(H.adjoint());    // A = H^* * A
48c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  * MatrixXd Q = H;                   // conversion to a dense matrix
49c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  * \endcode
50c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  * In addition to the adjoint, you can also apply the inverse (=adjoint), the transpose, and the conjugate operators.
51c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  *
52c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  * See the documentation for HouseholderSequence(const VectorsType&, const CoeffsType&) for an example.
53c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  *
54c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  * \sa MatrixBase::applyOnTheLeft(), MatrixBase::applyOnTheRight()
55c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  */
56c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath
57c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamathnamespace internal {
58c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath
59c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamathtemplate<typename VectorsType, typename CoeffsType, int Side>
60c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamathstruct traits<HouseholderSequence<VectorsType,CoeffsType,Side> >
61c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath{
62c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  typedef typename VectorsType::Scalar Scalar;
63c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  typedef typename VectorsType::Index Index;
64c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  typedef typename VectorsType::StorageKind StorageKind;
65c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  enum {
66c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    RowsAtCompileTime = Side==OnTheLeft ? traits<VectorsType>::RowsAtCompileTime
67c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath                                        : traits<VectorsType>::ColsAtCompileTime,
68c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    ColsAtCompileTime = RowsAtCompileTime,
69c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    MaxRowsAtCompileTime = Side==OnTheLeft ? traits<VectorsType>::MaxRowsAtCompileTime
70c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath                                           : traits<VectorsType>::MaxColsAtCompileTime,
71c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    MaxColsAtCompileTime = MaxRowsAtCompileTime,
72c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    Flags = 0
73c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  };
74c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath};
75c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath
76c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamathtemplate<typename VectorsType, typename CoeffsType, int Side>
77c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamathstruct hseq_side_dependent_impl
78c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath{
79c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  typedef Block<const VectorsType, Dynamic, 1> EssentialVectorType;
80c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  typedef HouseholderSequence<VectorsType, CoeffsType, OnTheLeft> HouseholderSequenceType;
81c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  typedef typename VectorsType::Index Index;
82c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  static inline const EssentialVectorType essentialVector(const HouseholderSequenceType& h, Index k)
83c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  {
84c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    Index start = k+1+h.m_shift;
85c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    return Block<const VectorsType,Dynamic,1>(h.m_vectors, start, k, h.rows()-start, 1);
86c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  }
87c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath};
88c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath
89c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamathtemplate<typename VectorsType, typename CoeffsType>
90c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamathstruct hseq_side_dependent_impl<VectorsType, CoeffsType, OnTheRight>
91c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath{
92c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  typedef Transpose<Block<const VectorsType, 1, Dynamic> > EssentialVectorType;
93c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  typedef HouseholderSequence<VectorsType, CoeffsType, OnTheRight> HouseholderSequenceType;
94c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  typedef typename VectorsType::Index Index;
95c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  static inline const EssentialVectorType essentialVector(const HouseholderSequenceType& h, Index k)
96c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  {
97c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    Index start = k+1+h.m_shift;
98c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    return Block<const VectorsType,1,Dynamic>(h.m_vectors, k, start, 1, h.rows()-start).transpose();
99c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  }
100c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath};
101c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath
102c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamathtemplate<typename OtherScalarType, typename MatrixType> struct matrix_type_times_scalar_type
103c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath{
104c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  typedef typename scalar_product_traits<OtherScalarType, typename MatrixType::Scalar>::ReturnType
105c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    ResultScalar;
106c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  typedef Matrix<ResultScalar, MatrixType::RowsAtCompileTime, MatrixType::ColsAtCompileTime,
107c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath                 0, MatrixType::MaxRowsAtCompileTime, MatrixType::MaxColsAtCompileTime> Type;
108c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath};
109c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath
110c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath} // end namespace internal
111c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath
112c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamathtemplate<typename VectorsType, typename CoeffsType, int Side> class HouseholderSequence
113c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  : public EigenBase<HouseholderSequence<VectorsType,CoeffsType,Side> >
114c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath{
1157faaa9f3f0df9d23790277834d426c3d992ac3baCarlos Hernandez    typedef typename internal::hseq_side_dependent_impl<VectorsType,CoeffsType,Side>::EssentialVectorType EssentialVectorType;
1167faaa9f3f0df9d23790277834d426c3d992ac3baCarlos Hernandez
1177faaa9f3f0df9d23790277834d426c3d992ac3baCarlos Hernandez  public:
118c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    enum {
119c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      RowsAtCompileTime = internal::traits<HouseholderSequence>::RowsAtCompileTime,
120c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      ColsAtCompileTime = internal::traits<HouseholderSequence>::ColsAtCompileTime,
121c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      MaxRowsAtCompileTime = internal::traits<HouseholderSequence>::MaxRowsAtCompileTime,
122c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      MaxColsAtCompileTime = internal::traits<HouseholderSequence>::MaxColsAtCompileTime
123c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    };
124c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    typedef typename internal::traits<HouseholderSequence>::Scalar Scalar;
125c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    typedef typename VectorsType::Index Index;
126c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath
127c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    typedef HouseholderSequence<
1287faaa9f3f0df9d23790277834d426c3d992ac3baCarlos Hernandez      typename internal::conditional<NumTraits<Scalar>::IsComplex,
1297faaa9f3f0df9d23790277834d426c3d992ac3baCarlos Hernandez        typename internal::remove_all<typename VectorsType::ConjugateReturnType>::type,
1307faaa9f3f0df9d23790277834d426c3d992ac3baCarlos Hernandez        VectorsType>::type,
131c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      typename internal::conditional<NumTraits<Scalar>::IsComplex,
132c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath        typename internal::remove_all<typename CoeffsType::ConjugateReturnType>::type,
133c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath        CoeffsType>::type,
134c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      Side
135c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    > ConjugateReturnType;
136c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath
137c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    /** \brief Constructor.
138c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      * \param[in]  v      %Matrix containing the essential parts of the Householder vectors
139c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      * \param[in]  h      Vector containing the Householder coefficients
140c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      *
141c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      * Constructs the Householder sequence with coefficients given by \p h and vectors given by \p v. The
142c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      * i-th Householder coefficient \f$ h_i \f$ is given by \p h(i) and the essential part of the i-th
143c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      * Householder vector \f$ v_i \f$ is given by \p v(k,i) with \p k > \p i (the subdiagonal part of the
144c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      * i-th column). If \p v has fewer columns than rows, then the Householder sequence contains as many
145c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      * Householder reflections as there are columns.
146c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      *
147c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      * \note The %HouseholderSequence object stores \p v and \p h by reference.
148c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      *
149c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      * Example: \include HouseholderSequence_HouseholderSequence.cpp
150c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      * Output: \verbinclude HouseholderSequence_HouseholderSequence.out
151c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      *
152c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      * \sa setLength(), setShift()
153c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      */
154c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    HouseholderSequence(const VectorsType& v, const CoeffsType& h)
155c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      : m_vectors(v), m_coeffs(h), m_trans(false), m_length(v.diagonalSize()),
156c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath        m_shift(0)
157c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    {
158c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    }
159c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath
160c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    /** \brief Copy constructor. */
161c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    HouseholderSequence(const HouseholderSequence& other)
162c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      : m_vectors(other.m_vectors),
163c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath        m_coeffs(other.m_coeffs),
164c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath        m_trans(other.m_trans),
165c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath        m_length(other.m_length),
166c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath        m_shift(other.m_shift)
167c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    {
168c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    }
169c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath
170c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    /** \brief Number of rows of transformation viewed as a matrix.
171c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      * \returns Number of rows
172c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      * \details This equals the dimension of the space that the transformation acts on.
173c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      */
174c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    Index rows() const { return Side==OnTheLeft ? m_vectors.rows() : m_vectors.cols(); }
175c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath
176c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    /** \brief Number of columns of transformation viewed as a matrix.
177c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      * \returns Number of columns
178c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      * \details This equals the dimension of the space that the transformation acts on.
179c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      */
180c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    Index cols() const { return rows(); }
181c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath
182c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    /** \brief Essential part of a Householder vector.
183c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      * \param[in]  k  Index of Householder reflection
184c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      * \returns    Vector containing non-trivial entries of k-th Householder vector
185c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      *
186c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      * This function returns the essential part of the Householder vector \f$ v_i \f$. This is a vector of
187c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      * length \f$ n-i \f$ containing the last \f$ n-i \f$ entries of the vector
188c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      * \f[
189c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      * v_i = [\underbrace{0, \ldots, 0}_{i-1\mbox{ zeros}}, 1, \underbrace{*, \ldots,*}_{n-i\mbox{ arbitrary entries}} ].
190c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      * \f]
191c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      * The index \f$ i \f$ equals \p k + shift(), corresponding to the k-th column of the matrix \p v
192c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      * passed to the constructor.
193c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      *
194c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      * \sa setShift(), shift()
195c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      */
196c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    const EssentialVectorType essentialVector(Index k) const
197c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    {
198c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      eigen_assert(k >= 0 && k < m_length);
199c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      return internal::hseq_side_dependent_impl<VectorsType,CoeffsType,Side>::essentialVector(*this, k);
200c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    }
201c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath
202c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    /** \brief %Transpose of the Householder sequence. */
203c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    HouseholderSequence transpose() const
204c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    {
205c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      return HouseholderSequence(*this).setTrans(!m_trans);
206c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    }
207c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath
208c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    /** \brief Complex conjugate of the Householder sequence. */
209c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    ConjugateReturnType conjugate() const
210c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    {
2117faaa9f3f0df9d23790277834d426c3d992ac3baCarlos Hernandez      return ConjugateReturnType(m_vectors.conjugate(), m_coeffs.conjugate())
212c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath             .setTrans(m_trans)
213c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath             .setLength(m_length)
214c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath             .setShift(m_shift);
215c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    }
216c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath
217c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    /** \brief Adjoint (conjugate transpose) of the Householder sequence. */
218c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    ConjugateReturnType adjoint() const
219c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    {
220c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      return conjugate().setTrans(!m_trans);
221c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    }
222c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath
223c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    /** \brief Inverse of the Householder sequence (equals the adjoint). */
224c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    ConjugateReturnType inverse() const { return adjoint(); }
225c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath
226c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    /** \internal */
227c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    template<typename DestType> inline void evalTo(DestType& dst) const
228c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    {
229c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      Matrix<Scalar, DestType::RowsAtCompileTime, 1,
230c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath             AutoAlign|ColMajor, DestType::MaxRowsAtCompileTime, 1> workspace(rows());
231c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      evalTo(dst, workspace);
232c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    }
233c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath
234c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    /** \internal */
235c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    template<typename Dest, typename Workspace>
236c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    void evalTo(Dest& dst, Workspace& workspace) const
237c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    {
238c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      workspace.resize(rows());
239c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      Index vecs = m_length;
240c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      if(    internal::is_same<typename internal::remove_all<VectorsType>::type,Dest>::value
241c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath          && internal::extract_data(dst) == internal::extract_data(m_vectors))
242c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      {
243c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath        // in-place
244c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath        dst.diagonal().setOnes();
245c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath        dst.template triangularView<StrictlyUpper>().setZero();
246c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath        for(Index k = vecs-1; k >= 0; --k)
247c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath        {
248c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath          Index cornerSize = rows() - k - m_shift;
249c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath          if(m_trans)
250c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath            dst.bottomRightCorner(cornerSize, cornerSize)
251c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath               .applyHouseholderOnTheRight(essentialVector(k), m_coeffs.coeff(k), workspace.data());
252c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath          else
253c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath            dst.bottomRightCorner(cornerSize, cornerSize)
254c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath               .applyHouseholderOnTheLeft(essentialVector(k), m_coeffs.coeff(k), workspace.data());
255c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath
256c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath          // clear the off diagonal vector
257c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath          dst.col(k).tail(rows()-k-1).setZero();
258c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath        }
259c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath        // clear the remaining columns if needed
260c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath        for(Index k = 0; k<cols()-vecs ; ++k)
261c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath          dst.col(k).tail(rows()-k-1).setZero();
262c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      }
263c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      else
264c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      {
265c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath        dst.setIdentity(rows(), rows());
266c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath        for(Index k = vecs-1; k >= 0; --k)
267c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath        {
268c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath          Index cornerSize = rows() - k - m_shift;
269c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath          if(m_trans)
270c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath            dst.bottomRightCorner(cornerSize, cornerSize)
271c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath               .applyHouseholderOnTheRight(essentialVector(k), m_coeffs.coeff(k), &workspace.coeffRef(0));
272c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath          else
273c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath            dst.bottomRightCorner(cornerSize, cornerSize)
274c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath               .applyHouseholderOnTheLeft(essentialVector(k), m_coeffs.coeff(k), &workspace.coeffRef(0));
275c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath        }
276c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      }
277c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    }
278c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath
279c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    /** \internal */
280c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    template<typename Dest> inline void applyThisOnTheRight(Dest& dst) const
281c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    {
282c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      Matrix<Scalar,1,Dest::RowsAtCompileTime,RowMajor,1,Dest::MaxRowsAtCompileTime> workspace(dst.rows());
283c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      applyThisOnTheRight(dst, workspace);
284c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    }
285c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath
286c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    /** \internal */
287c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    template<typename Dest, typename Workspace>
288c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    inline void applyThisOnTheRight(Dest& dst, Workspace& workspace) const
289c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    {
290c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      workspace.resize(dst.rows());
291c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      for(Index k = 0; k < m_length; ++k)
292c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      {
293c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath        Index actual_k = m_trans ? m_length-k-1 : k;
294c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath        dst.rightCols(rows()-m_shift-actual_k)
295c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath           .applyHouseholderOnTheRight(essentialVector(actual_k), m_coeffs.coeff(actual_k), workspace.data());
296c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      }
297c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    }
298c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath
299c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    /** \internal */
300c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    template<typename Dest> inline void applyThisOnTheLeft(Dest& dst) const
301c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    {
302c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      Matrix<Scalar,1,Dest::ColsAtCompileTime,RowMajor,1,Dest::MaxColsAtCompileTime> workspace(dst.cols());
303c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      applyThisOnTheLeft(dst, workspace);
304c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    }
305c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath
306c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    /** \internal */
307c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    template<typename Dest, typename Workspace>
308c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    inline void applyThisOnTheLeft(Dest& dst, Workspace& workspace) const
309c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    {
310c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      workspace.resize(dst.cols());
311c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      for(Index k = 0; k < m_length; ++k)
312c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      {
313c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath        Index actual_k = m_trans ? k : m_length-k-1;
314c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath        dst.bottomRows(rows()-m_shift-actual_k)
315c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath           .applyHouseholderOnTheLeft(essentialVector(actual_k), m_coeffs.coeff(actual_k), workspace.data());
316c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      }
317c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    }
318c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath
319c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    /** \brief Computes the product of a Householder sequence with a matrix.
320c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      * \param[in]  other  %Matrix being multiplied.
321c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      * \returns    Expression object representing the product.
322c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      *
323c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      * This function computes \f$ HM \f$ where \f$ H \f$ is the Householder sequence represented by \p *this
324c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      * and \f$ M \f$ is the matrix \p other.
325c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      */
326c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    template<typename OtherDerived>
327c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    typename internal::matrix_type_times_scalar_type<Scalar, OtherDerived>::Type operator*(const MatrixBase<OtherDerived>& other) const
328c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    {
329c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      typename internal::matrix_type_times_scalar_type<Scalar, OtherDerived>::Type
330c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath        res(other.template cast<typename internal::matrix_type_times_scalar_type<Scalar,OtherDerived>::ResultScalar>());
331c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      applyThisOnTheLeft(res);
332c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      return res;
333c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    }
334c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath
335c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    template<typename _VectorsType, typename _CoeffsType, int _Side> friend struct internal::hseq_side_dependent_impl;
336c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath
337c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    /** \brief Sets the length of the Householder sequence.
338c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      * \param [in]  length  New value for the length.
339c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      *
340c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      * By default, the length \f$ n \f$ of the Householder sequence \f$ H = H_0 H_1 \ldots H_{n-1} \f$ is set
341c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      * to the number of columns of the matrix \p v passed to the constructor, or the number of rows if that
342c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      * is smaller. After this function is called, the length equals \p length.
343c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      *
344c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      * \sa length()
345c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      */
346c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    HouseholderSequence& setLength(Index length)
347c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    {
348c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      m_length = length;
349c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      return *this;
350c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    }
351c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath
352c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    /** \brief Sets the shift of the Householder sequence.
353c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      * \param [in]  shift  New value for the shift.
354c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      *
355c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      * By default, a %HouseholderSequence object represents \f$ H = H_0 H_1 \ldots H_{n-1} \f$ and the i-th
356c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      * column of the matrix \p v passed to the constructor corresponds to the i-th Householder
357c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      * reflection. After this function is called, the object represents \f$ H = H_{\mathrm{shift}}
358c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      * H_{\mathrm{shift}+1} \ldots H_{n-1} \f$ and the i-th column of \p v corresponds to the (shift+i)-th
359c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      * Householder reflection.
360c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      *
361c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      * \sa shift()
362c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      */
363c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    HouseholderSequence& setShift(Index shift)
364c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    {
365c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      m_shift = shift;
366c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      return *this;
367c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    }
368c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath
369c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    Index length() const { return m_length; }  /**< \brief Returns the length of the Householder sequence. */
370c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    Index shift() const { return m_shift; }    /**< \brief Returns the shift of the Householder sequence. */
371c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath
372c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    /* Necessary for .adjoint() and .conjugate() */
373c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    template <typename VectorsType2, typename CoeffsType2, int Side2> friend class HouseholderSequence;
374c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath
375c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  protected:
376c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath
377c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    /** \brief Sets the transpose flag.
378c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      * \param [in]  trans  New value of the transpose flag.
379c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      *
380c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      * By default, the transpose flag is not set. If the transpose flag is set, then this object represents
381c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      * \f$ H^T = H_{n-1}^T \ldots H_1^T H_0^T \f$ instead of \f$ H = H_0 H_1 \ldots H_{n-1} \f$.
382c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      *
383c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      * \sa trans()
384c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      */
385c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    HouseholderSequence& setTrans(bool trans)
386c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    {
387c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      m_trans = trans;
388c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath      return *this;
389c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    }
390c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath
391c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    bool trans() const { return m_trans; }     /**< \brief Returns the transpose flag. */
392c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath
393c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    typename VectorsType::Nested m_vectors;
394c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    typename CoeffsType::Nested m_coeffs;
395c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    bool m_trans;
396c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    Index m_length;
397c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    Index m_shift;
398c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath};
399c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath
400c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath/** \brief Computes the product of a matrix with a Householder sequence.
401c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  * \param[in]  other  %Matrix being multiplied.
402c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  * \param[in]  h      %HouseholderSequence being multiplied.
403c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  * \returns    Expression object representing the product.
404c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  *
405c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  * This function computes \f$ MH \f$ where \f$ M \f$ is the matrix \p other and \f$ H \f$ is the
406c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  * Householder sequence represented by \p h.
407c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  */
408c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamathtemplate<typename OtherDerived, typename VectorsType, typename CoeffsType, int Side>
409c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamathtypename internal::matrix_type_times_scalar_type<typename VectorsType::Scalar,OtherDerived>::Type operator*(const MatrixBase<OtherDerived>& other, const HouseholderSequence<VectorsType,CoeffsType,Side>& h)
410c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath{
411c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  typename internal::matrix_type_times_scalar_type<typename VectorsType::Scalar,OtherDerived>::Type
412c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath    res(other.template cast<typename internal::matrix_type_times_scalar_type<typename VectorsType::Scalar,OtherDerived>::ResultScalar>());
413c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  h.applyThisOnTheRight(res);
414c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  return res;
415c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath}
416c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath
417c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath/** \ingroup Householder_Module \householder_module
418c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  * \brief Convenience function for constructing a Householder sequence.
419c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  * \returns A HouseholderSequence constructed from the specified arguments.
420c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  */
421c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamathtemplate<typename VectorsType, typename CoeffsType>
422c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan KamathHouseholderSequence<VectorsType,CoeffsType> householderSequence(const VectorsType& v, const CoeffsType& h)
423c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath{
424c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  return HouseholderSequence<VectorsType,CoeffsType,OnTheLeft>(v, h);
425c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath}
426c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath
427c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath/** \ingroup Householder_Module \householder_module
428c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  * \brief Convenience function for constructing a Householder sequence.
429c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  * \returns A HouseholderSequence constructed from the specified arguments.
430c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  * \details This function differs from householderSequence() in that the template argument \p OnTheSide of
431c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  * the constructed HouseholderSequence is set to OnTheRight, instead of the default OnTheLeft.
432c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  */
433c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamathtemplate<typename VectorsType, typename CoeffsType>
434c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan KamathHouseholderSequence<VectorsType,CoeffsType,OnTheRight> rightHouseholderSequence(const VectorsType& v, const CoeffsType& h)
435c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath{
436c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath  return HouseholderSequence<VectorsType,CoeffsType,OnTheRight>(v, h);
437c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath}
438c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath
439c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath} // end namespace Eigen
440c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath
441c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath#endif // EIGEN_HOUSEHOLDER_SEQUENCE_H
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