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Belos::TsqrOrthoManagerImpl< Scalar, MV > Class Template Reference

TSQR-based OrthoManager subclass implementation. More...

#include <BelosTsqrOrthoManagerImpl.hpp>

Inheritance diagram for Belos::TsqrOrthoManagerImpl< Scalar, MV >:
Inheritance graph
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Public Types

typedef Scalar scalar_type
 
typedef Teuchos::ScalarTraits
< Scalar >::magnitudeType 
magnitude_type
 
typedef MV multivector_type
 
typedef
Teuchos::SerialDenseMatrix
< int, Scalar > 
mat_type
 Type of the projection and normalization coefficients. More...
 
typedef Teuchos::RCP< mat_typemat_ptr
 

Public Member Functions

Teuchos::RCP< const
Teuchos::ParameterList
getValidParameters () const
 Default valid parameter list. More...
 
void setParameterList (const Teuchos::RCP< Teuchos::ParameterList > &params)
 Set parameters from the given parameter list. More...
 
Teuchos::RCP< const
Teuchos::ParameterList
getFastParameters ()
 Get "fast" parameters for TsqrOrthoManagerImpl. More...
 
 TsqrOrthoManagerImpl (const Teuchos::RCP< Teuchos::ParameterList > &params, const std::string &label)
 Constructor (that sets user-specified parameters). More...
 
 TsqrOrthoManagerImpl (const std::string &label)
 Constructor (that sets default parameters). More...
 
void setReorthogonalizationCallback (const Teuchos::RCP< ReorthogonalizationCallback< Scalar > > &callback)
 Set callback to be invoked on reorthogonalization. More...
 
void setLabel (const std::string &label)
 Set the label for timers. More...
 
const std::string & getLabel () const
 Get the label for timers (if timers are enabled). More...
 
void innerProd (const MV &X, const MV &Y, mat_type &Z) const
 Euclidean inner product. More...
 
void norm (const MV &X, std::vector< magnitude_type > &normVec) const
 Compute the 2-norm of each column j of X. More...
 
void project (MV &X, Teuchos::Array< mat_ptr > C, Teuchos::ArrayView< Teuchos::RCP< const MV > > Q)
 Compute $C := Q^* X$ and $X := X - Q C$. More...
 
int normalize (MV &X, mat_ptr B)
 Orthogonalize the columns of X in place. More...
 
int normalizeOutOfPlace (MV &X, MV &Q, mat_ptr B)
 Normalize X into Q*B, overwriting X. More...
 
int projectAndNormalize (MV &X, Teuchos::Array< mat_ptr > C, mat_ptr B, Teuchos::ArrayView< Teuchos::RCP< const MV > > Q)
 Project X against Q and normalize X. More...
 
int projectAndNormalizeOutOfPlace (MV &X_in, MV &X_out, Teuchos::Array< mat_ptr > C, mat_ptr B, Teuchos::ArrayView< Teuchos::RCP< const MV > > Q)
 Project and normalize X_in into X_out; overwrite X_in. More...
 
magnitude_type orthonormError (const MV &X) const
 Return $ \| I - X^* \cdot X \|_F $. More...
 
magnitude_type orthogError (const MV &X1, const MV &X2) const
 Return the Frobenius norm of the inner product of X1 with itself. More...
 
magnitude_type blockReorthogThreshold () const
 Relative tolerance for triggering a block reorthogonalization. More...
 
magnitude_type relativeRankTolerance () const
 Relative tolerance for determining (via the SVD) whether a block is of full numerical rank. More...
 
- Public Member Functions inherited from Teuchos::ParameterListAcceptorDefaultBase
RCP< ParameterListgetNonconstParameterList ()
 
RCP< ParameterListunsetParameterList ()
 
RCP< const ParameterListgetParameterList () const
 

Additional Inherited Members

- Protected Member Functions inherited from Teuchos::ParameterListAcceptorDefaultBase
void setMyParamList (const RCP< ParameterList > &paramList)
 
RCP< ParameterListgetMyNonconstParamList ()
 
RCP< const ParameterListgetMyParamList () const
 

Detailed Description

template<class Scalar, class MV>
class Belos::TsqrOrthoManagerImpl< Scalar, MV >

TSQR-based OrthoManager subclass implementation.

Author
Mark Hoemmen

TsqrOrthoManagerImpl implements the interface defined by OrthoManager, as well as the interface defined by OutOfPlaceNormalizerMixin. We use TsqrOrthoManagerImpl to implement TsqrOrthoManager and TsqrMatOrthoManager.

Template Parameters
ScalarThe type of matrix and (multi)vector entries.
MVThe type of (multi)vector inputs and outputs.

This class uses a combination of Tall Skinny QR (TSQR) and Block Gram-Schmidt (BGS) to orthogonalize multivectors. The Block Gram-Schmidt procedure used here is inspired by that of G. W. Stewart ("Block Gram-Schmidt Orthogonalization", SISC vol 31 #1 pp. 761–775, 2008). The difference is that we use TSQR+SVD instead of Stewart's careful Gram-Schmidt with reorthogonalization to handle the current block. "Orthogonalization faults" (as defined by Stewart) may still happen, but we do not handle them by default. Rather, we make one BGS pass, do TSQR+SVD, check the resulting column norms, and make a second BGS pass (+ TSQR+SVD) if necessary. If we then detect an orthogonalization fault, we throw TsqrOrthoFault.

Note
Despite the "Impl" part of the name of this class, we don't actually use it for the "pImpl" C++ idiom. We just separate out the TSQR implementation to make it easier to implement the OrthoManager and MatOrthoManager interfaces for the case where the inner product operator is not the identity matrix.

Definition at line 192 of file BelosTsqrOrthoManagerImpl.hpp.

Member Typedef Documentation

template<class Scalar , class MV >
typedef Scalar Belos::TsqrOrthoManagerImpl< Scalar, MV >::scalar_type

Definition at line 195 of file BelosTsqrOrthoManagerImpl.hpp.

template<class Scalar , class MV >
typedef Teuchos::ScalarTraits<Scalar>::magnitudeType Belos::TsqrOrthoManagerImpl< Scalar, MV >::magnitude_type

Definition at line 196 of file BelosTsqrOrthoManagerImpl.hpp.

template<class Scalar , class MV >
typedef MV Belos::TsqrOrthoManagerImpl< Scalar, MV >::multivector_type

Definition at line 197 of file BelosTsqrOrthoManagerImpl.hpp.

template<class Scalar , class MV >
typedef Teuchos::SerialDenseMatrix<int, Scalar> Belos::TsqrOrthoManagerImpl< Scalar, MV >::mat_type

Type of the projection and normalization coefficients.

Definition at line 199 of file BelosTsqrOrthoManagerImpl.hpp.

template<class Scalar , class MV >
typedef Teuchos::RCP<mat_type> Belos::TsqrOrthoManagerImpl< Scalar, MV >::mat_ptr

Definition at line 200 of file BelosTsqrOrthoManagerImpl.hpp.

Constructor & Destructor Documentation

template<class Scalar , class MV >
Belos::TsqrOrthoManagerImpl< Scalar, MV >::TsqrOrthoManagerImpl ( const Teuchos::RCP< Teuchos::ParameterList > &  params,
const std::string &  label 
)

Constructor (that sets user-specified parameters).

Parameters
params[in/out] Configuration parameters, both for this orthogonalization manager, and for TSQR itself (as the "TSQR implementation" sublist). This can be null, in which case default parameters will be set for now; you can always call setParameterList() later to change these.
label[in] Label for timers. This only matters if the compile-time option for enabling timers is set.

Call getValidParameters() for default parameters and their documentation, including TSQR implementation parameters. Call getFastParameters() to get documented parameters for faster computation, possibly at the expense of accuracy and robustness.

Definition at line 800 of file BelosTsqrOrthoManagerImpl.hpp.

template<class Scalar , class MV >
Belos::TsqrOrthoManagerImpl< Scalar, MV >::TsqrOrthoManagerImpl ( const std::string &  label)

Constructor (that sets default parameters).

Parameters
label[in] Label for timers. This only matters if the compile-time option for enabling timers is set.

Definition at line 823 of file BelosTsqrOrthoManagerImpl.hpp.

Member Function Documentation

template<class Scalar , class MV >
Teuchos::RCP< const Teuchos::ParameterList > Belos::TsqrOrthoManagerImpl< Scalar, MV >::getValidParameters ( ) const
virtual

Default valid parameter list.

Get a (pointer to a) default list of parameters for configuring a TsqrOrthoManagerImpl instance.

Note
TSQR implementation configuration options are stored under "TSQR implementation" as a sublist.

Reimplemented from Teuchos::ParameterListAcceptor.

Definition at line 1445 of file BelosTsqrOrthoManagerImpl.hpp.

template<class Scalar , class MV >
void Belos::TsqrOrthoManagerImpl< Scalar, MV >::setParameterList ( const Teuchos::RCP< Teuchos::ParameterList > &  params)
virtual

Set parameters from the given parameter list.

Implements Teuchos::ParameterListAcceptor.

Definition at line 741 of file BelosTsqrOrthoManagerImpl.hpp.

template<class Scalar , class MV >
Teuchos::RCP< const Teuchos::ParameterList > Belos::TsqrOrthoManagerImpl< Scalar, MV >::getFastParameters ( )

Get "fast" parameters for TsqrOrthoManagerImpl.

Get a (pointer to a) list of parameters for configuring a TsqrOrthoManager or TsqrMatOrthoManager instance for maximum speed, at the cost of accuracy (no block reorthogonalization) and robustness to rank deficiency (no randomization of the null space basis).

Note
TSQR implementation configuration options are stored under "TSQR implementation" as a sublist.

Definition at line 1510 of file BelosTsqrOrthoManagerImpl.hpp.

template<class Scalar , class MV >
void Belos::TsqrOrthoManagerImpl< Scalar, MV >::setReorthogonalizationCallback ( const Teuchos::RCP< ReorthogonalizationCallback< Scalar > > &  callback)
inline

Set callback to be invoked on reorthogonalization.

This callback is invoked right after the first projection step, and only if reorthogonalization will be necessary. It is called before actually reorthogonalizing. The first argument is a Teuchos::ArrayView of the norms of the columns of the input multivector before the first projection pass, and the second argument is a Teuchos::ArrayView of their norms after the first projection pass.

The callback is null by default. If the callback is null, no callback will be invoked.

For details and suggested uses, please refer to the documentation of ReorthogonalizationCallback.

Warning
We assume that the input arguments of the callback's operator() are only valid views within the scope of the function. Your callback should not keep the views.

Definition at line 278 of file BelosTsqrOrthoManagerImpl.hpp.

template<class Scalar , class MV >
void Belos::TsqrOrthoManagerImpl< Scalar, MV >::setLabel ( const std::string &  label)
inline

Set the label for timers.

This only matters if timers are enabled. If timers are enabled and the label changes, this method will clear the old timers and replace them with new ones. The old timers will not appear in the list of timers shown by Teuchos::TimeMonitor::summarize().

Definition at line 290 of file BelosTsqrOrthoManagerImpl.hpp.

template<class Scalar , class MV >
const std::string& Belos::TsqrOrthoManagerImpl< Scalar, MV >::getLabel ( ) const
inline

Get the label for timers (if timers are enabled).

Definition at line 307 of file BelosTsqrOrthoManagerImpl.hpp.

template<class Scalar , class MV >
void Belos::TsqrOrthoManagerImpl< Scalar, MV >::innerProd ( const MV &  X,
const MV &  Y,
mat_type Z 
) const
inline

Euclidean inner product.

Compute the Euclidean block inner product X^* Y, and store the result in Z.

Parameters
X[in]
Y[in]
Z[out] On output, $X^* Y$

Definition at line 318 of file BelosTsqrOrthoManagerImpl.hpp.

template<class Scalar , class MV >
void Belos::TsqrOrthoManagerImpl< Scalar, MV >::norm ( const MV &  X,
std::vector< magnitude_type > &  normVec 
) const

Compute the 2-norm of each column j of X.

Parameters
X[in] Multivector for which to compute column norms.
normVec[out] On output: normvec[j] is the 2-norm of column j of X. normVec is resized if necessary so that it has at least as many entries as there are columns of X.
Note
Performance of this method depends on how MultiVecTraits implements column norm computation for the given multivector type MV. It may or may not be the case that a reduction is performed for every column of X. Furthermore, whether or not the columns of X are contiguous (as opposed to a view of noncontiguous columns) may also affect performance. The computed results should be the same regardless, except perhaps for small rounding differences due to a different order of operations.

Definition at line 846 of file BelosTsqrOrthoManagerImpl.hpp.

template<class Scalar , class MV >
void Belos::TsqrOrthoManagerImpl< Scalar, MV >::project ( MV &  X,
Teuchos::Array< mat_ptr C,
Teuchos::ArrayView< Teuchos::RCP< const MV > >  Q 
)

Compute $C := Q^* X$ and $X := X - Q C$.

Project X against the span of the (Euclidean) orthogonal vectors Q, and store the resulting coefficients in C.

Parameters
X[in/out] On input: the vectors to project. On output: $X := X - Q C$ where $C := Q^* X$.
C[out] The projection coefficients $C := Q^* X$
Q[in] The orthogonal basis against which to project

Definition at line 858 of file BelosTsqrOrthoManagerImpl.hpp.

template<class Scalar , class MV >
int Belos::TsqrOrthoManagerImpl< Scalar, MV >::normalize ( MV &  X,
mat_ptr  B 
)

Orthogonalize the columns of X in place.

Orthogonalize the columns of X in place, storing the resulting coefficients in B. Return the rank of X. If X is full rank, then X*B on output is a QR factorization of X on input. If X is not full rank, then the first rank columns of X on output form a basis for the column space of X (on input). Additional options control randomization of the null space basis.

Parameters
X[in/out]
B[out]
Returns
Rank of X

Definition at line 937 of file BelosTsqrOrthoManagerImpl.hpp.

template<class Scalar , class MV >
int Belos::TsqrOrthoManagerImpl< Scalar, MV >::normalizeOutOfPlace ( MV &  X,
MV &  Q,
mat_ptr  B 
)

Normalize X into Q*B, overwriting X.

Normalize X into Q*B, overwriting X with invalid values.

Parameters
X[in/out] Vector(s) to normalize
Q[out] Normalized vector(s)
B[out] Normalization coefficients
Returns
Rank of X
Note
Q must have at least as many columns as X. It may have more columns than X; those columns are ignored.
We expose this interface to applications because TSQR is not able to compute an orthogonal basis in place; it needs scratch space. Applications can exploit this interface to avoid excessive copying of vectors when using TSQR for orthogonalization.

Definition at line 1055 of file BelosTsqrOrthoManagerImpl.hpp.

template<class Scalar , class MV >
int Belos::TsqrOrthoManagerImpl< Scalar, MV >::projectAndNormalize ( MV &  X,
Teuchos::Array< mat_ptr C,
mat_ptr  B,
Teuchos::ArrayView< Teuchos::RCP< const MV > >  Q 
)
inline

Project X against Q and normalize X.

This method is equivalent (in exact arithmetic) to project(X,C,Q) followed by normalize(X,B). However, the interface allows this method to implement reorthogonalization more efficiently and accurately.

Parameters
X[in/out] The vectors to project against Q and normalize
C[out] The projection coefficients
B[out] The normalization coefficients
Q[in] The orthogonal basis against which to project
Returns
Rank of X after projection

Definition at line 407 of file BelosTsqrOrthoManagerImpl.hpp.

template<class Scalar , class MV >
int Belos::TsqrOrthoManagerImpl< Scalar, MV >::projectAndNormalizeOutOfPlace ( MV &  X_in,
MV &  X_out,
Teuchos::Array< mat_ptr C,
mat_ptr  B,
Teuchos::ArrayView< Teuchos::RCP< const MV > >  Q 
)
inline

Project and normalize X_in into X_out; overwrite X_in.

Project X_in against Q, storing projection coefficients in C, and normalize X_in into X_out, storing normalization coefficients in B. On output, X_out has the resulting orthogonal vectors and X_in is overwritten with invalid values.

Parameters
X_in[in/out] On input: The vectors to project against Q and normalize. On output: Overwritten with invalid values.
X_out[out] The normalized input vectors after projection against Q.
C[out] Projection coefficients
B[out] Normalization coefficients
Q[in] The orthogonal basis against which to project
Returns
Rank of X_in after projection
Note
We expose this interface to applications for the same reason that we expose normalizeOutOfPlace().

Definition at line 437 of file BelosTsqrOrthoManagerImpl.hpp.

template<class Scalar , class MV >
magnitude_type Belos::TsqrOrthoManagerImpl< Scalar, MV >::orthonormError ( const MV &  X) const
inline

Return $ \| I - X^* \cdot X \|_F $.

Return the Frobenius norm of I - X^* X, which is an absolute measure of the orthogonality of the columns of X.

Definition at line 453 of file BelosTsqrOrthoManagerImpl.hpp.

template<class Scalar , class MV >
magnitude_type Belos::TsqrOrthoManagerImpl< Scalar, MV >::orthogError ( const MV &  X1,
const MV &  X2 
) const
inline

Return the Frobenius norm of the inner product of X1 with itself.

Definition at line 467 of file BelosTsqrOrthoManagerImpl.hpp.

template<class Scalar , class MV >
magnitude_type Belos::TsqrOrthoManagerImpl< Scalar, MV >::blockReorthogThreshold ( ) const
inline

Relative tolerance for triggering a block reorthogonalization.

If any column norm in a block decreases by this amount, then we reorthogonalize.

Definition at line 480 of file BelosTsqrOrthoManagerImpl.hpp.

template<class Scalar , class MV >
magnitude_type Belos::TsqrOrthoManagerImpl< Scalar, MV >::relativeRankTolerance ( ) const
inline

Relative tolerance for determining (via the SVD) whether a block is of full numerical rank.

Definition at line 484 of file BelosTsqrOrthoManagerImpl.hpp.


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

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