test/lu.cpp - platform/external/eigen - Git at Google

 // This file is part of Eigen, a lightweight C++ template library
 // for linear algebra.
 //
 // Copyright (C) 2008-2009 Benoit Jacob <jacob.benoit.1@gmail.com>
 //
 // This Source Code Form is subject to the terms of the Mozilla
 // Public License v. 2.0. If a copy of the MPL was not distributed
 // with this file, You can obtain one at http://mozilla.org/MPL/2.0/.

 #include "main.h"
 #include <Eigen/LU>
 using namespace std;

 template<typename MatrixType> void lu_non_invertible()
 {
   typedef typename MatrixType::Index Index;
   typedef typename MatrixType::Scalar Scalar;
   typedef typename MatrixType::RealScalar RealScalar;
   /* this test covers the following files:
      LU.h
   */
   Index rows, cols, cols2;
   if(MatrixType::RowsAtCompileTime==Dynamic)
   {
     rows = internal::random<Index>(2,EIGEN_TEST_MAX_SIZE);
   }
   else
   {
     rows = MatrixType::RowsAtCompileTime;
   }
   if(MatrixType::ColsAtCompileTime==Dynamic)
   {
     cols = internal::random<Index>(2,EIGEN_TEST_MAX_SIZE);
     cols2 = internal::random<int>(2,EIGEN_TEST_MAX_SIZE);
   }
   else
   {
     cols2 = cols = MatrixType::ColsAtCompileTime;
   }

   enum {
     RowsAtCompileTime = MatrixType::RowsAtCompileTime,
     ColsAtCompileTime = MatrixType::ColsAtCompileTime
   };
   typedef typename internal::kernel_retval_base<FullPivLU<MatrixType> >::ReturnType KernelMatrixType;
   typedef typename internal::image_retval_base<FullPivLU<MatrixType> >::ReturnType ImageMatrixType;
   typedef Matrix<typename MatrixType::Scalar, ColsAtCompileTime, ColsAtCompileTime>
           CMatrixType;
   typedef Matrix<typename MatrixType::Scalar, RowsAtCompileTime, RowsAtCompileTime>
           RMatrixType;

   Index rank = internal::random<Index>(1, (std::min)(rows, cols)-1);

   // The image of the zero matrix should consist of a single (zero) column vector
   VERIFY((MatrixType::Zero(rows,cols).fullPivLu().image(MatrixType::Zero(rows,cols)).cols() == 1));

   MatrixType m1(rows, cols), m3(rows, cols2);
   CMatrixType m2(cols, cols2);
   createRandomPIMatrixOfRank(rank, rows, cols, m1);

   FullPivLU<MatrixType> lu;

   // The special value 0.01 below works well in tests. Keep in mind that we're only computing the rank
   // of singular values are either 0 or 1.
   // So it's not clear at all that the epsilon should play any role there.
   lu.setThreshold(RealScalar(0.01));
   lu.compute(m1);

   MatrixType u(rows,cols);
   u = lu.matrixLU().template triangularView<Upper>();
   RMatrixType l = RMatrixType::Identity(rows,rows);
   l.block(0,0,rows,(std::min)(rows,cols)).template triangularView<StrictlyLower>()
     = lu.matrixLU().block(0,0,rows,(std::min)(rows,cols));

   VERIFY_IS_APPROX(lu.permutationP() * m1 * lu.permutationQ(), l*u);

   KernelMatrixType m1kernel = lu.kernel();
   ImageMatrixType m1image = lu.image(m1);

   VERIFY_IS_APPROX(m1, lu.reconstructedMatrix());
   VERIFY(rank == lu.rank());
   VERIFY(cols - lu.rank() == lu.dimensionOfKernel());
   VERIFY(!lu.isInjective());
   VERIFY(!lu.isInvertible());
   VERIFY(!lu.isSurjective());
   VERIFY((m1 * m1kernel).isMuchSmallerThan(m1));
   VERIFY(m1image.fullPivLu().rank() == rank);
   VERIFY_IS_APPROX(m1 * m1.adjoint() * m1image, m1image);

   m2 = CMatrixType::Random(cols,cols2);
   m3 = m1*m2;
   m2 = CMatrixType::Random(cols,cols2);
   // test that the code, which does resize(), may be applied to an xpr
   m2.block(0,0,m2.rows(),m2.cols()) = lu.solve(m3);
   VERIFY_IS_APPROX(m3, m1*m2);
 }

 template<typename MatrixType> void lu_invertible()
 {
   /* this test covers the following files:
      LU.h
   */
   typedef typename MatrixType::Scalar Scalar;
   typedef typename NumTraits<typename MatrixType::Scalar>::Real RealScalar;
   int size = internal::random<int>(1,EIGEN_TEST_MAX_SIZE);

   MatrixType m1(size, size), m2(size, size), m3(size, size);
   FullPivLU<MatrixType> lu;
   lu.setThreshold(RealScalar(0.01));
   do {
     m1 = MatrixType::Random(size,size);
     lu.compute(m1);
   } while(!lu.isInvertible());

   VERIFY_IS_APPROX(m1, lu.reconstructedMatrix());
   VERIFY(0 == lu.dimensionOfKernel());
   VERIFY(lu.kernel().cols() == 1); // the kernel() should consist of a single (zero) column vector
   VERIFY(size == lu.rank());
   VERIFY(lu.isInjective());
   VERIFY(lu.isSurjective());
   VERIFY(lu.isInvertible());
   VERIFY(lu.image(m1).fullPivLu().isInvertible());
   m3 = MatrixType::Random(size,size);
   m2 = lu.solve(m3);
   VERIFY_IS_APPROX(m3, m1*m2);
   VERIFY_IS_APPROX(m2, lu.inverse()*m3);
 }

 template<typename MatrixType> void lu_partial_piv()
 {
   /* this test covers the following files:
      PartialPivLU.h
   */
   typedef typename MatrixType::Index Index;
   typedef typename MatrixType::Scalar Scalar;
   typedef typename NumTraits<typename MatrixType::Scalar>::Real RealScalar;
   Index rows = internal::random<Index>(1,4);
   Index cols = rows;

   MatrixType m1(cols, rows);
   m1.setRandom();
   PartialPivLU<MatrixType> plu(m1);

   VERIFY_IS_APPROX(m1, plu.reconstructedMatrix());
 }

 template<typename MatrixType> void lu_verify_assert()
 {
   MatrixType tmp;

   FullPivLU<MatrixType> lu;
   VERIFY_RAISES_ASSERT(lu.matrixLU())
   VERIFY_RAISES_ASSERT(lu.permutationP())
   VERIFY_RAISES_ASSERT(lu.permutationQ())
   VERIFY_RAISES_ASSERT(lu.kernel())
   VERIFY_RAISES_ASSERT(lu.image(tmp))
   VERIFY_RAISES_ASSERT(lu.solve(tmp))
   VERIFY_RAISES_ASSERT(lu.determinant())
   VERIFY_RAISES_ASSERT(lu.rank())
   VERIFY_RAISES_ASSERT(lu.dimensionOfKernel())
   VERIFY_RAISES_ASSERT(lu.isInjective())
   VERIFY_RAISES_ASSERT(lu.isSurjective())
   VERIFY_RAISES_ASSERT(lu.isInvertible())
   VERIFY_RAISES_ASSERT(lu.inverse())

   PartialPivLU<MatrixType> plu;
   VERIFY_RAISES_ASSERT(plu.matrixLU())
   VERIFY_RAISES_ASSERT(plu.permutationP())
   VERIFY_RAISES_ASSERT(plu.solve(tmp))
   VERIFY_RAISES_ASSERT(plu.determinant())
   VERIFY_RAISES_ASSERT(plu.inverse())
 }

 void test_lu()
 {
   for(int i = 0; i < g_repeat; i++) {
     CALL_SUBTEST_1( lu_non_invertible<Matrix3f>() );
     CALL_SUBTEST_1( lu_verify_assert<Matrix3f>() );

     CALL_SUBTEST_2( (lu_non_invertible<Matrix<double, 4, 6> >()) );
     CALL_SUBTEST_2( (lu_verify_assert<Matrix<double, 4, 6> >()) );

     CALL_SUBTEST_3( lu_non_invertible<MatrixXf>() );
     CALL_SUBTEST_3( lu_invertible<MatrixXf>() );
     CALL_SUBTEST_3( lu_verify_assert<MatrixXf>() );

     CALL_SUBTEST_4( lu_non_invertible<MatrixXd>() );
     CALL_SUBTEST_4( lu_invertible<MatrixXd>() );
     CALL_SUBTEST_4( lu_partial_piv<MatrixXd>() );
     CALL_SUBTEST_4( lu_verify_assert<MatrixXd>() );

     CALL_SUBTEST_5( lu_non_invertible<MatrixXcf>() );
     CALL_SUBTEST_5( lu_invertible<MatrixXcf>() );
     CALL_SUBTEST_5( lu_verify_assert<MatrixXcf>() );

     CALL_SUBTEST_6( lu_non_invertible<MatrixXcd>() );
     CALL_SUBTEST_6( lu_invertible<MatrixXcd>() );
     CALL_SUBTEST_6( lu_partial_piv<MatrixXcd>() );
     CALL_SUBTEST_6( lu_verify_assert<MatrixXcd>() );

     CALL_SUBTEST_7(( lu_non_invertible<Matrix<float,Dynamic,16> >() ));

     // Test problem size constructors
     CALL_SUBTEST_9( PartialPivLU<MatrixXf>(10) );
     CALL_SUBTEST_9( FullPivLU<MatrixXf>(10, 20); );
   }
 }
	// This file is part of Eigen, a lightweight C++ template library
	// for linear algebra.
	//
	// Copyright (C) 2008-2009 Benoit Jacob <jacob.benoit.1@gmail.com>
	//
	// This Source Code Form is subject to the terms of the Mozilla
	// Public License v. 2.0. If a copy of the MPL was not distributed
	// with this file, You can obtain one at http://mozilla.org/MPL/2.0/.

	#include "main.h"
	#include <Eigen/LU>
	using namespace std;

	template<typename MatrixType> void lu_non_invertible()
	{
	typedef typename MatrixType::Index Index;
	typedef typename MatrixType::Scalar Scalar;
	typedef typename MatrixType::RealScalar RealScalar;
	/* this test covers the following files:
	LU.h
	*/
	Index rows, cols, cols2;
	if(MatrixType::RowsAtCompileTime==Dynamic)
	{
	rows = internal::random<Index>(2,EIGEN_TEST_MAX_SIZE);
	}
	else
	{
	rows = MatrixType::RowsAtCompileTime;
	}
	if(MatrixType::ColsAtCompileTime==Dynamic)
	{
	cols = internal::random<Index>(2,EIGEN_TEST_MAX_SIZE);
	cols2 = internal::random<int>(2,EIGEN_TEST_MAX_SIZE);
	}
	else
	{
	cols2 = cols = MatrixType::ColsAtCompileTime;
	}

	enum {
	RowsAtCompileTime = MatrixType::RowsAtCompileTime,
	ColsAtCompileTime = MatrixType::ColsAtCompileTime
	};
	typedef typename internal::kernel_retval_base<FullPivLU<MatrixType> >::ReturnType KernelMatrixType;
	typedef typename internal::image_retval_base<FullPivLU<MatrixType> >::ReturnType ImageMatrixType;
	typedef Matrix<typename MatrixType::Scalar, ColsAtCompileTime, ColsAtCompileTime>
	CMatrixType;
	typedef Matrix<typename MatrixType::Scalar, RowsAtCompileTime, RowsAtCompileTime>
	RMatrixType;

	Index rank = internal::random<Index>(1, (std::min)(rows, cols)-1);

	// The image of the zero matrix should consist of a single (zero) column vector
	VERIFY((MatrixType::Zero(rows,cols).fullPivLu().image(MatrixType::Zero(rows,cols)).cols() == 1));

	MatrixType m1(rows, cols), m3(rows, cols2);
	CMatrixType m2(cols, cols2);
	createRandomPIMatrixOfRank(rank, rows, cols, m1);

	FullPivLU<MatrixType> lu;

	// The special value 0.01 below works well in tests. Keep in mind that we're only computing the rank
	// of singular values are either 0 or 1.
	// So it's not clear at all that the epsilon should play any role there.
	lu.setThreshold(RealScalar(0.01));
	lu.compute(m1);

	MatrixType u(rows,cols);
	u = lu.matrixLU().template triangularView<Upper>();
	RMatrixType l = RMatrixType::Identity(rows,rows);
	l.block(0,0,rows,(std::min)(rows,cols)).template triangularView<StrictlyLower>()
	= lu.matrixLU().block(0,0,rows,(std::min)(rows,cols));

	VERIFY_IS_APPROX(lu.permutationP() * m1 * lu.permutationQ(), l*u);

	KernelMatrixType m1kernel = lu.kernel();
	ImageMatrixType m1image = lu.image(m1);

	VERIFY_IS_APPROX(m1, lu.reconstructedMatrix());
	VERIFY(rank == lu.rank());
	VERIFY(cols - lu.rank() == lu.dimensionOfKernel());
	VERIFY(!lu.isInjective());
	VERIFY(!lu.isInvertible());
	VERIFY(!lu.isSurjective());
	VERIFY((m1 * m1kernel).isMuchSmallerThan(m1));
	VERIFY(m1image.fullPivLu().rank() == rank);
	VERIFY_IS_APPROX(m1 * m1.adjoint() * m1image, m1image);

	m2 = CMatrixType::Random(cols,cols2);
	m3 = m1*m2;
	m2 = CMatrixType::Random(cols,cols2);
	// test that the code, which does resize(), may be applied to an xpr
	m2.block(0,0,m2.rows(),m2.cols()) = lu.solve(m3);
	VERIFY_IS_APPROX(m3, m1*m2);
	}

	template<typename MatrixType> void lu_invertible()
	{
	/* this test covers the following files:
	LU.h
	*/
	typedef typename MatrixType::Scalar Scalar;
	typedef typename NumTraits<typename MatrixType::Scalar>::Real RealScalar;
	int size = internal::random<int>(1,EIGEN_TEST_MAX_SIZE);

	MatrixType m1(size, size), m2(size, size), m3(size, size);
	FullPivLU<MatrixType> lu;
	lu.setThreshold(RealScalar(0.01));
	do {
	m1 = MatrixType::Random(size,size);
	lu.compute(m1);
	} while(!lu.isInvertible());

	VERIFY_IS_APPROX(m1, lu.reconstructedMatrix());
	VERIFY(0 == lu.dimensionOfKernel());
	VERIFY(lu.kernel().cols() == 1); // the kernel() should consist of a single (zero) column vector
	VERIFY(size == lu.rank());
	VERIFY(lu.isInjective());
	VERIFY(lu.isSurjective());
	VERIFY(lu.isInvertible());
	VERIFY(lu.image(m1).fullPivLu().isInvertible());
	m3 = MatrixType::Random(size,size);
	m2 = lu.solve(m3);
	VERIFY_IS_APPROX(m3, m1*m2);
	VERIFY_IS_APPROX(m2, lu.inverse()*m3);
	}

	template<typename MatrixType> void lu_partial_piv()
	{
	/* this test covers the following files:
	PartialPivLU.h
	*/
	typedef typename MatrixType::Index Index;
	typedef typename MatrixType::Scalar Scalar;
	typedef typename NumTraits<typename MatrixType::Scalar>::Real RealScalar;
	Index rows = internal::random<Index>(1,4);
	Index cols = rows;

	MatrixType m1(cols, rows);
	m1.setRandom();
	PartialPivLU<MatrixType> plu(m1);

	VERIFY_IS_APPROX(m1, plu.reconstructedMatrix());
	}

	template<typename MatrixType> void lu_verify_assert()
	{
	MatrixType tmp;

	FullPivLU<MatrixType> lu;
	VERIFY_RAISES_ASSERT(lu.matrixLU())
	VERIFY_RAISES_ASSERT(lu.permutationP())
	VERIFY_RAISES_ASSERT(lu.permutationQ())
	VERIFY_RAISES_ASSERT(lu.kernel())
	VERIFY_RAISES_ASSERT(lu.image(tmp))
	VERIFY_RAISES_ASSERT(lu.solve(tmp))
	VERIFY_RAISES_ASSERT(lu.determinant())
	VERIFY_RAISES_ASSERT(lu.rank())
	VERIFY_RAISES_ASSERT(lu.dimensionOfKernel())
	VERIFY_RAISES_ASSERT(lu.isInjective())
	VERIFY_RAISES_ASSERT(lu.isSurjective())
	VERIFY_RAISES_ASSERT(lu.isInvertible())
	VERIFY_RAISES_ASSERT(lu.inverse())

	PartialPivLU<MatrixType> plu;
	VERIFY_RAISES_ASSERT(plu.matrixLU())
	VERIFY_RAISES_ASSERT(plu.permutationP())
	VERIFY_RAISES_ASSERT(plu.solve(tmp))
	VERIFY_RAISES_ASSERT(plu.determinant())
	VERIFY_RAISES_ASSERT(plu.inverse())
	}

	void test_lu()
	{
	for(int i = 0; i < g_repeat; i++) {
	CALL_SUBTEST_1( lu_non_invertible<Matrix3f>() );
	CALL_SUBTEST_1( lu_verify_assert<Matrix3f>() );

	CALL_SUBTEST_2( (lu_non_invertible<Matrix<double, 4, 6> >()) );
	CALL_SUBTEST_2( (lu_verify_assert<Matrix<double, 4, 6> >()) );

	CALL_SUBTEST_3( lu_non_invertible<MatrixXf>() );
	CALL_SUBTEST_3( lu_invertible<MatrixXf>() );
	CALL_SUBTEST_3( lu_verify_assert<MatrixXf>() );

	CALL_SUBTEST_4( lu_non_invertible<MatrixXd>() );
	CALL_SUBTEST_4( lu_invertible<MatrixXd>() );
	CALL_SUBTEST_4( lu_partial_piv<MatrixXd>() );
	CALL_SUBTEST_4( lu_verify_assert<MatrixXd>() );

	CALL_SUBTEST_5( lu_non_invertible<MatrixXcf>() );
	CALL_SUBTEST_5( lu_invertible<MatrixXcf>() );
	CALL_SUBTEST_5( lu_verify_assert<MatrixXcf>() );

	CALL_SUBTEST_6( lu_non_invertible<MatrixXcd>() );
	CALL_SUBTEST_6( lu_invertible<MatrixXcd>() );
	CALL_SUBTEST_6( lu_partial_piv<MatrixXcd>() );
	CALL_SUBTEST_6( lu_verify_assert<MatrixXcd>() );

	CALL_SUBTEST_7(( lu_non_invertible<Matrix<float,Dynamic,16> >() ));

	// Test problem size constructors
	CALL_SUBTEST_9( PartialPivLU<MatrixXf>(10) );
	CALL_SUBTEST_9( FullPivLU<MatrixXf>(10, 20); );
	}
	}