/usr/include/linbox/solutions/is-positive-definite.h is in liblinbox-dev 1.3.2-1.1+b1.
This file is owned by root:root, with mode 0o644.
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*
*
* ========LICENCE========
* This file is part of the library LinBox.
*
* LinBox is free software: you can redistribute it and/or modify
* it under the terms of the GNU Lesser General Public
* License as published by the Free Software Foundation; either
* version 2.1 of the License, or (at your option) any later version.
*
* This library is distributed in the hope that it will be useful,
* but WITHOUT ANY WARRANTY; without even the implied warranty of
* MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the GNU
* Lesser General Public License for more details.
*
* You should have received a copy of the GNU Lesser General Public
* License along with this library; if not, write to the Free Software
* Foundation, Inc., 51 Franklin Street, Fifth Floor, Boston, MA 02110-1301 USA
* ========LICENCE========
*/
#ifndef __LINBOX_is_positive_definite_H
#define __LINBOX_is_positive_definite_H
#include "linbox/util/error.h"
#include "linbox/algorithms/matrix-hom.h"
#include "linbox/algorithms/signature.h"
namespace LinBox
{
// for specialization with respect to the DomainCategory
template< class Blackbox, class isPositiveDefiniteMethod, class DomainCategory>
bool isPositiveDefinite (
const Blackbox &A,
const DomainCategory &tag,
const isPositiveDefiniteMethod &M);
/** Compute the isPositiveDefinite of A.
*
* The isPositiveDefinite of a linear operator A, represented as a
* black box, is computed over the ring or field of A.
*
* @param A Black box of which to compute the isPositiveDefinite
* @param M may be a Method::Hybrid (default), Method::Blackbox, Method::Elimination, or of other method type.
\ingroup isPositiveDefinites
*/
template <class Blackbox, class MyMethod>
bool isPositiveDefinite (
const Blackbox &A,
const MyMethod &M)
{
return isPositiveDefinite( A, typename FieldTraits<typename Blackbox::Field>::categoryTag(), M);
}
// The isPositiveDefinite with default Method
template<class Blackbox>
bool isPositiveDefinite ( const Blackbox &A)
{
return isPositiveDefinite(A,
Method::Hybrid());
}
// The isPositiveDefinite for ModularTag (is nonsense)
template<class Blackbox, class MyMethod>
bool isPositiveDefinite (
const Blackbox &A,
const RingCategories::ModularTag &tag,
const MyMethod& M)
{
//commentator << "nonsense!!"
throw (LinboxError("isPositiveDefinite: Integer matrix required"));
return false;
}
// The isPositiveDefinite with Hybrid Method
template<class Blackbox>
bool isPositiveDefinite (
const Blackbox &A,
const RingCategories::IntegerTag &tag,
const Method::Hybrid& M)
{
// should try a modular minpoly and decide on the degree of that...
if (A.rowdim() != A.coldim()) return false;
// this crude size check can be refined
if (A.coldim() > 7000) return isPositiveDefinite(A, tag, Method::Blackbox(M));
else return isPositiveDefinite(A, tag, Method::Elimination(M));
}
// The isPositiveDefinite with Elimination Method
template<class Blackbox>
bool isPositiveDefinite (
const Blackbox &A,
const RingCategories::IntegerTag &tag,
const Method::Elimination& M)
{
// this can be a hybrid of EliminationMinpoly and BlasElimination (which means use LU here)
// It will be faster to do EliminationMinpoly when deg(m_A) is low.
// right now it is just BlasElimination
return isPositiveDefinite(A, tag, Method::BlasElimination(M));
}
// The isPositiveDefinite with BlackBox Method
template<class Blackbox>
bool isPositiveDefinite (
const Blackbox &A,
const RingCategories::IntegerTag &tag,
const Method::Blackbox &M)
{
return isPositiveDefinite(A, tag, Method::Wiedemann(M));
}
// The isPositiveDefinite with Wiedemann, finite field.
template <class Blackbox>
bool isPositiveDefinite (
const Blackbox &A,
const RingCategories::IntegerTag &tag,
const Method::Wiedemann &M)
{
// call Wiedemann code
return Signature::isPosDef(A, Signature::Minpoly_Method() );
}
// the isPositiveDefinite with Blas.
template <class Blackbox>
bool isPositiveDefinite (
const Blackbox &A,
const RingCategories::IntegerTag &tag,
const Method::BlasElimination &M)
{
// call BlasElimination code
BlasMatrix<typename Blackbox::Field> DA(A.field(), A.rowdim(), A.coldim());
MatrixHom::map(DA, A, A. field());
return Signature::isPosDef(DA, Signature::BLAS_LPM_Method() );
}
template <class Ring>
bool isPositiveDefinite (
const BlasMatrix<Ring> &A,
const RingCategories::IntegerTag &tag,
const Method::BlasElimination &M)
{
// call BlasElimination code
return Signature::isPosDef(A, Signature::BLAS_LPM_Method() );
}
} // end of LinBox namespace
#endif // __LINBOX_is_positive_definite_H
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