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queso-0.56.1
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Abstract base class for operator objects. Operators are assumed to be symmetric and positive-definite. More...
#include <OperatorBase.h>
Public Member Functions | |
| virtual double | get_eigenvalue (unsigned int i) const =0 |
Return eigenvalue i. More... | |
| virtual double | get_inverted_eigenvalue (unsigned int i) const =0 |
Return the reciprocal of eigenvalue i. More... | |
| virtual unsigned int | get_num_converged () const =0 |
| Return the number of converged eigenpairs. More... | |
| virtual SharedPtr < FunctionBase >::Type | inverse_kl_transform (std::vector< double > &xi, double alpha) const =0 |
Given coefficients xi, computes the Karhunen-Loeve transform. More... | |
Constructor/Destructor methods | |
| OperatorBase () | |
| Constructor. More... | |
| virtual | ~OperatorBase () |
| Destructor. More... | |
Abstract base class for operator objects. Operators are assumed to be symmetric and positive-definite.
Definition at line 45 of file OperatorBase.h.
| QUESO::OperatorBase::OperatorBase | ( | ) |
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virtual |
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pure virtual |
Return eigenvalue i.
You can store them however you want, but having some kind of order to them is useful for InfiniteDimensionalMeasure
Referenced by QUESO::InfiniteDimensionalGaussian::get_kl_coefficient().
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pure virtual |
Return the reciprocal of eigenvalue i.
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pure virtual |
Return the number of converged eigenpairs.
Referenced by QUESO::InfiniteDimensionalGaussian::draw(), and QUESO::InfiniteDimensionalGaussian::InfiniteDimensionalGaussian().
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pure virtual |
Given coefficients xi, computes the Karhunen-Loeve transform.
This transform goes from coefficient space to physical space using this as the precision operator: / pow(, alpha / 2.0) (x) where the lambda are eigenvalues of the precision operator, this, and the (x) are eigenfunctions of the precision operator, this
Referenced by QUESO::InfiniteDimensionalGaussian::draw().