Public Types | Public Member Functions | Protected Attributes | Private Types | Static Private Member Functions
Eigen::HessenbergDecomposition< _MatrixType > Class Template Reference

Reduces a square matrix to Hessenberg form by an orthogonal similarity transformation. More...

#include <HessenbergDecomposition.h>

List of all members.

Public Types

enum  {
  Size = MatrixType::RowsAtCompileTime, SizeMinusOne = Size == Dynamic ? Dynamic : Size - 1, Options = MatrixType::Options, MaxSize = MatrixType::MaxRowsAtCompileTime,
  MaxSizeMinusOne = MaxSize == Dynamic ? Dynamic : MaxSize - 1
}
typedef Matrix< Scalar,
SizeMinusOne, 1, Options
&~RowMajor, MaxSizeMinusOne, 1 > 
CoeffVectorType
 Type for vector of Householder coefficients.
typedef HouseholderSequence
< MatrixType, typename
internal::remove_all< typename
CoeffVectorType::ConjugateReturnType >
::type
HouseholderSequenceType
 Return type of matrixQ()
typedef MatrixType::Index Index
typedef
internal::HessenbergDecompositionMatrixHReturnType
< MatrixType
MatrixHReturnType
typedef _MatrixType MatrixType
 Synonym for the template parameter _MatrixType.
typedef MatrixType::Scalar Scalar
 Scalar type for matrices of type MatrixType.

Public Member Functions

HessenbergDecompositioncompute (const MatrixType &matrix)
 Computes Hessenberg decomposition of given matrix.
 HessenbergDecomposition (Index size=Size==Dynamic?2:Size)
 Default constructor; the decomposition will be computed later.
 HessenbergDecomposition (const MatrixType &matrix)
 Constructor; computes Hessenberg decomposition of given matrix.
const CoeffVectorTypehouseholderCoefficients () const
 Returns the Householder coefficients.
MatrixHReturnType matrixH () const
 Constructs the Hessenberg matrix H in the decomposition.
HouseholderSequenceType matrixQ () const
 Reconstructs the orthogonal matrix Q in the decomposition.
const MatrixTypepackedMatrix () const
 Returns the internal representation of the decomposition.

Protected Attributes

CoeffVectorType m_hCoeffs
bool m_isInitialized
MatrixType m_matrix
VectorType m_temp

Private Types

typedef NumTraits< Scalar >::Real RealScalar
typedef Matrix< Scalar,
1, Size, Options|RowMajor,
1, MaxSize
VectorType

Static Private Member Functions

static void _compute (MatrixType &matA, CoeffVectorType &hCoeffs, VectorType &temp)

Detailed Description

template<typename _MatrixType>
class Eigen::HessenbergDecomposition< _MatrixType >

Reduces a square matrix to Hessenberg form by an orthogonal similarity transformation.

Template Parameters:
_MatrixTypethe type of the matrix of which we are computing the Hessenberg decomposition

This class performs an Hessenberg decomposition of a matrix $ A $. In the real case, the Hessenberg decomposition consists of an orthogonal matrix $ Q $ and a Hessenberg matrix $ H $ such that $ A = Q H Q^T $. An orthogonal matrix is a matrix whose inverse equals its transpose ( $ Q^{-1} = Q^T $). A Hessenberg matrix has zeros below the subdiagonal, so it is almost upper triangular. The Hessenberg decomposition of a complex matrix is $ A = Q H Q^* $ with $ Q $ unitary (that is, $ Q^{-1} = Q^* $).

Call the function compute() to compute the Hessenberg decomposition of a given matrix. Alternatively, you can use the HessenbergDecomposition(const MatrixType&) constructor which computes the Hessenberg decomposition at construction time. Once the decomposition is computed, you can use the matrixH() and matrixQ() functions to construct the matrices H and Q in the decomposition.

The documentation for matrixH() contains an example of the typical use of this class.

See also:
class ComplexSchur, class Tridiagonalization, QR Module

Definition at line 57 of file HessenbergDecomposition.h.


Member Typedef Documentation

template<typename _MatrixType>
typedef Matrix<Scalar, SizeMinusOne, 1, Options & ~RowMajor, MaxSizeMinusOne, 1> Eigen::HessenbergDecomposition< _MatrixType >::CoeffVectorType

Type for vector of Householder coefficients.

This is column vector with entries of type Scalar. The length of the vector is one less than the size of MatrixType, if it is a fixed-side type.

Definition at line 82 of file HessenbergDecomposition.h.

Return type of matrixQ()

Definition at line 85 of file HessenbergDecomposition.h.

template<typename _MatrixType>
typedef MatrixType::Index Eigen::HessenbergDecomposition< _MatrixType >::Index

Definition at line 74 of file HessenbergDecomposition.h.

Definition at line 87 of file HessenbergDecomposition.h.

template<typename _MatrixType>
typedef _MatrixType Eigen::HessenbergDecomposition< _MatrixType >::MatrixType

Synonym for the template parameter _MatrixType.

Definition at line 62 of file HessenbergDecomposition.h.

template<typename _MatrixType>
typedef NumTraits<Scalar>::Real Eigen::HessenbergDecomposition< _MatrixType >::RealScalar [private]

Definition at line 269 of file HessenbergDecomposition.h.

template<typename _MatrixType>
typedef MatrixType::Scalar Eigen::HessenbergDecomposition< _MatrixType >::Scalar

Scalar type for matrices of type MatrixType.

Definition at line 73 of file HessenbergDecomposition.h.

template<typename _MatrixType>
typedef Matrix<Scalar, 1, Size, Options | RowMajor, 1, MaxSize> Eigen::HessenbergDecomposition< _MatrixType >::VectorType [private]

Definition at line 268 of file HessenbergDecomposition.h.


Member Enumeration Documentation

template<typename _MatrixType>
anonymous enum
Enumerator:
Size 
SizeMinusOne 
Options 
MaxSize 
MaxSizeMinusOne 

Definition at line 64 of file HessenbergDecomposition.h.


Constructor & Destructor Documentation

template<typename _MatrixType>
Eigen::HessenbergDecomposition< _MatrixType >::HessenbergDecomposition ( Index  size = Size==Dynamic ? 2 : Size) [inline]

Default constructor; the decomposition will be computed later.

Parameters:
[in]sizeThe size of the matrix whose Hessenberg decomposition will be computed.

The default constructor is useful in cases in which the user intends to perform decompositions via compute(). The size parameter is only used as a hint. It is not an error to give a wrong size, but it may impair performance.

See also:
compute() for an example.

Definition at line 100 of file HessenbergDecomposition.h.

template<typename _MatrixType>
Eigen::HessenbergDecomposition< _MatrixType >::HessenbergDecomposition ( const MatrixType matrix) [inline]

Constructor; computes Hessenberg decomposition of given matrix.

Parameters:
[in]matrixSquare matrix whose Hessenberg decomposition is to be computed.

This constructor calls compute() to compute the Hessenberg decomposition.

See also:
matrixH() for an example.

Definition at line 118 of file HessenbergDecomposition.h.


Member Function Documentation

template<typename MatrixType >
void Eigen::HessenbergDecomposition< MatrixType >::_compute ( MatrixType matA,
CoeffVectorType hCoeffs,
VectorType temp 
) [static, private]

Definition at line 292 of file HessenbergDecomposition.h.

template<typename _MatrixType>
HessenbergDecomposition& Eigen::HessenbergDecomposition< _MatrixType >::compute ( const MatrixType matrix) [inline]

Computes Hessenberg decomposition of given matrix.

Parameters:
[in]matrixSquare matrix whose Hessenberg decomposition is to be computed.
Returns:
Reference to *this

The Hessenberg decomposition is computed by bringing the columns of the matrix successively in the required form using Householder reflections (see, e.g., Algorithm 7.4.2 in Golub & Van Loan, Matrix Computations). The cost is $ 10n^3/3 $ flops, where $ n $ denotes the size of the given matrix.

This method reuses of the allocated data in the HessenbergDecomposition object.

Example:

Output:

Definition at line 150 of file HessenbergDecomposition.h.

template<typename _MatrixType>
const CoeffVectorType& Eigen::HessenbergDecomposition< _MatrixType >::householderCoefficients ( ) const [inline]

Returns the Householder coefficients.

Returns:
a const reference to the vector of Householder coefficients
Precondition:
Either the constructor HessenbergDecomposition(const MatrixType&) or the member function compute(const MatrixType&) has been called before to compute the Hessenberg decomposition of a matrix.

The Householder coefficients allow the reconstruction of the matrix $ Q $ in the Hessenberg decomposition from the packed data.

See also:
packedMatrix(), Householder module

Definition at line 177 of file HessenbergDecomposition.h.

template<typename _MatrixType>
MatrixHReturnType Eigen::HessenbergDecomposition< _MatrixType >::matrixH ( ) const [inline]

Constructs the Hessenberg matrix H in the decomposition.

Returns:
expression object representing the matrix H
Precondition:
Either the constructor HessenbergDecomposition(const MatrixType&) or the member function compute(const MatrixType&) has been called before to compute the Hessenberg decomposition of a matrix.

The object returned by this function constructs the Hessenberg matrix H when it is assigned to a matrix or otherwise evaluated. The matrix H is constructed from the packed matrix as returned by packedMatrix(): The upper part (including the subdiagonal) of the packed matrix contains the matrix H. It may sometimes be better to directly use the packed matrix instead of constructing the matrix H.

Example:

Output:

See also:
matrixQ(), packedMatrix()

Definition at line 260 of file HessenbergDecomposition.h.

template<typename _MatrixType>
HouseholderSequenceType Eigen::HessenbergDecomposition< _MatrixType >::matrixQ ( void  ) const [inline]

Reconstructs the orthogonal matrix Q in the decomposition.

Returns:
object representing the matrix Q
Precondition:
Either the constructor HessenbergDecomposition(const MatrixType&) or the member function compute(const MatrixType&) has been called before to compute the Hessenberg decomposition of a matrix.

This function returns a light-weight object of template class HouseholderSequence. You can either apply it directly to a matrix or you can convert it to a matrix of type MatrixType.

See also:
matrixH() for an example, class HouseholderSequence

Definition at line 232 of file HessenbergDecomposition.h.

template<typename _MatrixType>
const MatrixType& Eigen::HessenbergDecomposition< _MatrixType >::packedMatrix ( ) const [inline]

Returns the internal representation of the decomposition.

Returns:
a const reference to a matrix with the internal representation of the decomposition.
Precondition:
Either the constructor HessenbergDecomposition(const MatrixType&) or the member function compute(const MatrixType&) has been called before to compute the Hessenberg decomposition of a matrix.

The returned matrix contains the following information:

  • the upper part and lower sub-diagonal represent the Hessenberg matrix H
  • the rest of the lower part contains the Householder vectors that, combined with Householder coefficients returned by householderCoefficients(), allows to reconstruct the matrix Q as $ Q = H_{N-1} \ldots H_1 H_0 $. Here, the matrices $ H_i $ are the Householder transformations $ H_i = (I - h_i v_i v_i^T) $ where $ h_i $ is the $ i $th Householder coefficient and $ v_i $ is the Householder vector defined by $ v_i = [ 0, \ldots, 0, 1, M(i+2,i), \ldots, M(N-1,i) ]^T $ with M the matrix returned by this function.

See LAPACK for further details on this packed storage.

Example:

Output:

See also:
householderCoefficients()

Definition at line 212 of file HessenbergDecomposition.h.


Member Data Documentation

template<typename _MatrixType>
CoeffVectorType Eigen::HessenbergDecomposition< _MatrixType >::m_hCoeffs [protected]

Definition at line 274 of file HessenbergDecomposition.h.

template<typename _MatrixType>
bool Eigen::HessenbergDecomposition< _MatrixType >::m_isInitialized [protected]

Definition at line 276 of file HessenbergDecomposition.h.

template<typename _MatrixType>
MatrixType Eigen::HessenbergDecomposition< _MatrixType >::m_matrix [protected]

Definition at line 273 of file HessenbergDecomposition.h.

template<typename _MatrixType>
VectorType Eigen::HessenbergDecomposition< _MatrixType >::m_temp [protected]

Definition at line 275 of file HessenbergDecomposition.h.


The documentation for this class was generated from the following file:


acado
Author(s): Milan Vukov, Rien Quirynen
autogenerated on Sat Jun 8 2019 19:40:44