#include <HouseholderSequence.h>
Public Types | |
| enum | { RowsAtCompileTime = internal::traits<HouseholderSequence>::RowsAtCompileTime, ColsAtCompileTime = internal::traits<HouseholderSequence>::ColsAtCompileTime, MaxRowsAtCompileTime = internal::traits<HouseholderSequence>::MaxRowsAtCompileTime, MaxColsAtCompileTime = internal::traits<HouseholderSequence>::MaxColsAtCompileTime } |
| typedef internal::traits< HouseholderSequence >::Scalar | Scalar |
| typedef HouseholderSequence< typename internal::conditional< NumTraits< Scalar >::IsComplex, typename internal::remove_all< typename VectorsType::ConjugateReturnType >::type, VectorsType >::type, typename internal::conditional< NumTraits< Scalar >::IsComplex, typename internal::remove_all< typename CoeffsType::ConjugateReturnType >::type, CoeffsType >::type, Side > | ConjugateReturnType |
 Public Types inherited from Eigen::EigenBase< HouseholderSequence< VectorsType, CoeffsType, Side > > | |
| typedef Eigen::Index | Index |
| The interface type of indices. More... | |
| typedef internal::traits< HouseholderSequence< VectorsType, CoeffsType, Side > >::StorageKind | StorageKind |
Public Member Functions | |
| HouseholderSequence (const VectorsType &v, const CoeffsType &h) | |
| Constructor. More... | |
| HouseholderSequence (const HouseholderSequence &other) | |
| Copy constructor. More... | |
| Index | rows () const |
| Number of rows of transformation viewed as a matrix. More... | |
| Index | cols () const |
| Number of columns of transformation viewed as a matrix. More... | |
| const EssentialVectorType | essentialVector (Index k) const |
| Essential part of a Householder vector. More... | |
| HouseholderSequence | transpose () const |
| Transpose of the Householder sequence. More... | |
| ConjugateReturnType | conjugate () const |
| Complex conjugate of the Householder sequence. More... | |
| ConjugateReturnType | adjoint () const |
| Adjoint (conjugate transpose) of the Householder sequence. More... | |
| ConjugateReturnType | inverse () const |
| Inverse of the Householder sequence (equals the adjoint). More... | |
| template<typename DestType > | |
| void | evalTo (DestType &dst) const |
| template<typename Dest , typename Workspace > | |
| void | evalTo (Dest &dst, Workspace &workspace) const |
| template<typename Dest > | |
| void | applyThisOnTheRight (Dest &dst) const |
| template<typename Dest , typename Workspace > | |
| void | applyThisOnTheRight (Dest &dst, Workspace &workspace) const |
| template<typename Dest > | |
| void | applyThisOnTheLeft (Dest &dst) const |
| template<typename Dest , typename Workspace > | |
| void | applyThisOnTheLeft (Dest &dst, Workspace &workspace) const |
| template<typename OtherDerived > | |
| internal::matrix_type_times_scalar_type< Scalar, OtherDerived >::Type | operator* (const MatrixBase< OtherDerived > &other) const |
| Computes the product of a Householder sequence with a matrix. More... | |
| HouseholderSequence & | setLength (Index length) |
| Sets the length of the Householder sequence. More... | |
| HouseholderSequence & | setShift (Index shift) |
| Sets the shift of the Householder sequence. More... | |
| Index | length () const |
| Returns the length of the Householder sequence. More... | |
| Index | shift () const |
| Returns the shift of the Householder sequence. More... | |
| Public Member Functions inherited from Eigen::EigenBase< HouseholderSequence< VectorsType, CoeffsType, Side > > | |
| EIGEN_DEVICE_FUNC HouseholderSequence< VectorsType, CoeffsType, Side > & | derived () |
| EIGEN_DEVICE_FUNC const HouseholderSequence< VectorsType, CoeffsType, Side > & | derived () const |
| EIGEN_DEVICE_FUNC HouseholderSequence< VectorsType, CoeffsType, Side > & | const_cast_derived () const |
| EIGEN_DEVICE_FUNC const HouseholderSequence< VectorsType, CoeffsType, Side > & | const_derived () const |
| EIGEN_DEVICE_FUNC Index | rows () const |
| EIGEN_DEVICE_FUNC Index | cols () const |
| EIGEN_DEVICE_FUNC Index | size () const |
| EIGEN_DEVICE_FUNC void | evalTo (Dest &dst) const |
| EIGEN_DEVICE_FUNC void | addTo (Dest &dst) const |
| EIGEN_DEVICE_FUNC void | subTo (Dest &dst) const |
| EIGEN_DEVICE_FUNC void | applyThisOnTheRight (Dest &dst) const |
| EIGEN_DEVICE_FUNC void | applyThisOnTheLeft (Dest &dst) const |
Protected Member Functions | |
| HouseholderSequence & | setTrans (bool trans) |
| Sets the transpose flag. More... | |
| bool | trans () const |
| Returns the transpose flag. More... | |
Protected Attributes | |
| VectorsType::Nested | m_vectors |
| CoeffsType::Nested | m_coeffs |
| bool | m_trans |
| Index | m_length |
| Index | m_shift |
Detailed Description
template<typename VectorsType, typename CoeffsType, int Side>
class Eigen::HouseholderSequence< VectorsType, CoeffsType, Side >
Sequence of Householder reflections acting on subspaces with decreasing size
- Template Parameters
-
VectorsType type of matrix containing the Householder vectors CoeffsType type of vector containing the Householder coefficients Side either OnTheLeft (the default) or OnTheRight
This class represents a product sequence of Householder reflections where the first Householder reflection acts on the whole space, the second Householder reflection leaves the one-dimensional subspace spanned by the first unit vector invariant, the third Householder reflection leaves the two-dimensional subspace spanned by the first two unit vectors invariant, and so on up to the last reflection which leaves all but one dimensions invariant and acts only on the last dimension. Such sequences of Householder reflections are used in several algorithms to zero out certain parts of a matrix. Indeed, the methods HessenbergDecomposition::matrixQ(), Tridiagonalization::matrixQ(), HouseholderQR::householderQ(), and ColPivHouseholderQR::householderQ() all return a HouseholderSequence.
More precisely, the class HouseholderSequence represents an \( n \times n \) matrix \( H \) of the form \( H = \prod_{i=0}^{n-1} H_i \) where the i-th Householder reflection is \( H_i = I - h_i v_i v_i^* \). The i-th Householder coefficient \( h_i \) is a scalar and the i-th Householder vector \( v_i \) is a vector of the form
\[ v_i = [\underbrace{0, \ldots, 0}_{i-1\mbox{ zeros}}, 1, \underbrace{*, \ldots,*}_{n-i\mbox{ arbitrary entries}} ]. \]
The last \( n-i \) entries of \( v_i \) are called the essential part of the Householder vector.
Typical usages are listed below, where H is a HouseholderSequence:
In addition to the adjoint, you can also apply the inverse (=adjoint), the transpose, and the conjugate operators.
See the documentation for HouseholderSequence(const VectorsType&, const CoeffsType&) for an example.
Constructor & Destructor Documentation
§ HouseholderSequence() [1/2]
|
inline |
Constructor.
- Parameters
-
[in] v Matrix containing the essential parts of the Householder vectors [in] h Vector containing the Householder coefficients
Constructs the Householder sequence with coefficients given by h and vectors given by v. The i-th Householder coefficient \( h_i \) is given by h(i) and the essential part of the i-th Householder vector \( v_i \) is given by v(k,i) with k > i (the subdiagonal part of the i-th column). If v has fewer columns than rows, then the Householder sequence contains as many Householder reflections as there are columns.
- Note
- The HouseholderSequence object stores
vandhby reference.
Example:
Output:
- See also
- setLength(), setShift()
§ HouseholderSequence() [2/2]
|
inline |
Copy constructor.
Member Function Documentation
§ adjoint()
|
inline |
Adjoint (conjugate transpose) of the Householder sequence.
§ cols()
|
inline |
Number of columns of transformation viewed as a matrix.
- Returns
- Number of columns
This equals the dimension of the space that the transformation acts on.
§ conjugate()
|
inline |
Complex conjugate of the Householder sequence.
§ essentialVector()
|
inline |
Essential part of a Householder vector.
- Parameters
-
[in] k Index of Householder reflection
- Returns
- Vector containing non-trivial entries of k-th Householder vector
This function returns the essential part of the Householder vector \( v_i \). This is a vector of length \( n-i \) containing the last \( n-i \) entries of the vector
\[ v_i = [\underbrace{0, \ldots, 0}_{i-1\mbox{ zeros}}, 1, \underbrace{*, \ldots,*}_{n-i\mbox{ arbitrary entries}} ]. \]
The index \( i \) equals k + shift(), corresponding to the k-th column of the matrix v passed to the constructor.
- See also
- setShift(), shift()
§ inverse()
|
inline |
Inverse of the Householder sequence (equals the adjoint).
§ length()
|
inline |
Returns the length of the Householder sequence.
§ operator*()
|
inline |
Computes the product of a Householder sequence with a matrix.
- Parameters
-
[in] other Matrix being multiplied.
- Returns
- Expression object representing the product.
This function computes \( HM \) where \( H \) is the Householder sequence represented by *this and \( M \) is the matrix other.
§ rows()
|
inline |
Number of rows of transformation viewed as a matrix.
- Returns
- Number of rows
This equals the dimension of the space that the transformation acts on.
§ setLength()
|
inline |
Sets the length of the Householder sequence.
- Parameters
-
[in] length New value for the length.
By default, the length \( n \) of the Householder sequence \( H = H_0 H_1 \ldots H_{n-1} \) is set to the number of columns of the matrix v passed to the constructor, or the number of rows if that is smaller. After this function is called, the length equals length.
- See also
- length()
§ setShift()
|
inline |
Sets the shift of the Householder sequence.
- Parameters
-
[in] shift New value for the shift.
By default, a HouseholderSequence object represents \( H = H_0 H_1 \ldots H_{n-1} \) and the i-th column of the matrix v passed to the constructor corresponds to the i-th Householder reflection. After this function is called, the object represents \( H = H_{\mathrm{shift}} H_{\mathrm{shift}+1} \ldots H_{n-1} \) and the i-th column of v corresponds to the (shift+i)-th Householder reflection.
- See also
- shift()
§ setTrans()
|
inlineprotected |
Sets the transpose flag.
- Parameters
-
[in] trans New value of the transpose flag.
By default, the transpose flag is not set. If the transpose flag is set, then this object represents \( H^T = H_{n-1}^T \ldots H_1^T H_0^T \) instead of \( H = H_0 H_1 \ldots H_{n-1} \).
- See also
- trans()
§ shift()
|
inline |
Returns the shift of the Householder sequence.
§ trans()
|
inlineprotected |
Returns the transpose flag.
§ transpose()
|
inline |
Transpose of the Householder sequence.
The documentation for this class was generated from the following files:
- third-party-libs/eigen3/Eigen/src/Core/util/ForwardDeclarations.h
- third-party-libs/eigen3/Eigen/src/Householder/HouseholderSequence.h
