test/eigen2/eigen2_triangular.cpp - platform/external/eigen - Git at Google

 // This file is part of Eigen, a lightweight C++ template library
 // for linear algebra. Eigen itself is part of the KDE project.
 //
 // Copyright (C) 2008 Gael Guennebaud <gael.guennebaud@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"

 template<typename MatrixType> void triangular(const MatrixType& m)
 {
   typedef typename MatrixType::Scalar Scalar;
   typedef typename NumTraits<Scalar>::Real RealScalar;

   RealScalar largerEps = 10*test_precision<RealScalar>();

   int rows = m.rows();
   int cols = m.cols();

   MatrixType m1 = MatrixType::Random(rows, cols),
              m2 = MatrixType::Random(rows, cols),
              m3(rows, cols),
              m4(rows, cols),
              r1(rows, cols),
              r2(rows, cols);

   MatrixType m1up = m1.template part<Eigen::UpperTriangular>();
   MatrixType m2up = m2.template part<Eigen::UpperTriangular>();

   if (rows*cols>1)
   {
     VERIFY(m1up.isUpperTriangular());
     VERIFY(m2up.transpose().isLowerTriangular());
     VERIFY(!m2.isLowerTriangular());
   }

 //   VERIFY_IS_APPROX(m1up.transpose() * m2, m1.upper().transpose().lower() * m2);

   // test overloaded operator+=
   r1.setZero();
   r2.setZero();
   r1.template part<Eigen::UpperTriangular>() +=  m1;
   r2 += m1up;
   VERIFY_IS_APPROX(r1,r2);

   // test overloaded operator=
   m1.setZero();
   m1.template part<Eigen::UpperTriangular>() = (m2.transpose() * m2).lazy();
   m3 = m2.transpose() * m2;
   VERIFY_IS_APPROX(m3.template part<Eigen::LowerTriangular>().transpose(), m1);

   // test overloaded operator=
   m1.setZero();
   m1.template part<Eigen::LowerTriangular>() = (m2.transpose() * m2).lazy();
   VERIFY_IS_APPROX(m3.template part<Eigen::LowerTriangular>(), m1);

   VERIFY_IS_APPROX(m3.template part<Diagonal>(), m3.diagonal().asDiagonal());

   m1 = MatrixType::Random(rows, cols);
   for (int i=0; i<rows; ++i)
     while (ei_abs2(m1(i,i))<1e-3) m1(i,i) = ei_random<Scalar>();

   Transpose<MatrixType> trm4(m4);
   // test back and forward subsitution
   m3 = m1.template part<Eigen::LowerTriangular>();
   VERIFY(m3.template marked<Eigen::LowerTriangular>().solveTriangular(m3).cwise().abs().isIdentity(test_precision<RealScalar>()));
   VERIFY(m3.transpose().template marked<Eigen::UpperTriangular>()
     .solveTriangular(m3.transpose()).cwise().abs().isIdentity(test_precision<RealScalar>()));
   // check M * inv(L) using in place API
   m4 = m3;
   m3.transpose().template marked<Eigen::UpperTriangular>().solveTriangularInPlace(trm4);
   VERIFY(m4.cwise().abs().isIdentity(test_precision<RealScalar>()));

   m3 = m1.template part<Eigen::UpperTriangular>();
   VERIFY(m3.template marked<Eigen::UpperTriangular>().solveTriangular(m3).cwise().abs().isIdentity(test_precision<RealScalar>()));
   VERIFY(m3.transpose().template marked<Eigen::LowerTriangular>()
     .solveTriangular(m3.transpose()).cwise().abs().isIdentity(test_precision<RealScalar>()));
   // check M * inv(U) using in place API
   m4 = m3;
   m3.transpose().template marked<Eigen::LowerTriangular>().solveTriangularInPlace(trm4);
   VERIFY(m4.cwise().abs().isIdentity(test_precision<RealScalar>()));

   m3 = m1.template part<Eigen::UpperTriangular>();
   VERIFY(m2.isApprox(m3 * (m3.template marked<Eigen::UpperTriangular>().solveTriangular(m2)), largerEps));
   m3 = m1.template part<Eigen::LowerTriangular>();
   VERIFY(m2.isApprox(m3 * (m3.template marked<Eigen::LowerTriangular>().solveTriangular(m2)), largerEps));

   VERIFY((m1.template part<Eigen::UpperTriangular>() * m2.template part<Eigen::UpperTriangular>()).isUpperTriangular());

   // test swap
   m1.setOnes();
   m2.setZero();
   m2.template part<Eigen::UpperTriangular>().swap(m1);
   m3.setZero();
   m3.template part<Eigen::UpperTriangular>().setOnes();
   VERIFY_IS_APPROX(m2,m3);

 }

 void selfadjoint()
 {
   Matrix2i m;
   m << 1, 2,
        3, 4;

   Matrix2i m1 = Matrix2i::Zero();
   m1.part<SelfAdjoint>() = m;
   Matrix2i ref1;
   ref1 << 1, 2,
           2, 4;
   VERIFY(m1 == ref1);

   Matrix2i m2 = Matrix2i::Zero();
   m2.part<SelfAdjoint>() = m.part<UpperTriangular>();
   Matrix2i ref2;
   ref2 << 1, 2,
           2, 4;
   VERIFY(m2 == ref2);

   Matrix2i m3 = Matrix2i::Zero();
   m3.part<SelfAdjoint>() = m.part<LowerTriangular>();
   Matrix2i ref3;
   ref3 << 1, 0,
           0, 4;
   VERIFY(m3 == ref3);

   // example inspired from bug 159
   int array[] = {1, 2, 3, 4};
   Matrix2i::Map(array).part<SelfAdjoint>() = Matrix2i::Random().part<LowerTriangular>();

   std::cout << "hello\n" << array << std::endl;
 }

 void test_eigen2_triangular()
 {
   CALL_SUBTEST_8( selfadjoint() );
   for(int i = 0; i < g_repeat ; i++) {
     CALL_SUBTEST_1( triangular(Matrix<float, 1, 1>()) );
     CALL_SUBTEST_2( triangular(Matrix<float, 2, 2>()) );
     CALL_SUBTEST_3( triangular(Matrix3d()) );
     CALL_SUBTEST_4( triangular(MatrixXcf(4, 4)) );
     CALL_SUBTEST_5( triangular(Matrix<std::complex<float>,8, 8>()) );
     CALL_SUBTEST_6( triangular(MatrixXd(17,17)) );
     CALL_SUBTEST_7( triangular(Matrix<float,Dynamic,Dynamic,RowMajor>(5, 5)) );
   }
 }
	// This file is part of Eigen, a lightweight C++ template library
	// for linear algebra. Eigen itself is part of the KDE project.
	//
	// Copyright (C) 2008 Gael Guennebaud <gael.guennebaud@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"

	template<typename MatrixType> void triangular(const MatrixType& m)
	{
	typedef typename MatrixType::Scalar Scalar;
	typedef typename NumTraits<Scalar>::Real RealScalar;

	RealScalar largerEps = 10*test_precision<RealScalar>();

	int rows = m.rows();
	int cols = m.cols();

	MatrixType m1 = MatrixType::Random(rows, cols),
	m2 = MatrixType::Random(rows, cols),
	m3(rows, cols),
	m4(rows, cols),
	r1(rows, cols),
	r2(rows, cols);

	MatrixType m1up = m1.template part<Eigen::UpperTriangular>();
	MatrixType m2up = m2.template part<Eigen::UpperTriangular>();

	if (rows*cols>1)
	{
	VERIFY(m1up.isUpperTriangular());
	VERIFY(m2up.transpose().isLowerTriangular());
	VERIFY(!m2.isLowerTriangular());
	}

	// VERIFY_IS_APPROX(m1up.transpose() * m2, m1.upper().transpose().lower() * m2);

	// test overloaded operator+=
	r1.setZero();
	r2.setZero();
	r1.template part<Eigen::UpperTriangular>() += m1;
	r2 += m1up;
	VERIFY_IS_APPROX(r1,r2);

	// test overloaded operator=
	m1.setZero();
	m1.template part<Eigen::UpperTriangular>() = (m2.transpose() * m2).lazy();
	m3 = m2.transpose() * m2;
	VERIFY_IS_APPROX(m3.template part<Eigen::LowerTriangular>().transpose(), m1);

	// test overloaded operator=
	m1.setZero();
	m1.template part<Eigen::LowerTriangular>() = (m2.transpose() * m2).lazy();
	VERIFY_IS_APPROX(m3.template part<Eigen::LowerTriangular>(), m1);

	VERIFY_IS_APPROX(m3.template part<Diagonal>(), m3.diagonal().asDiagonal());

	m1 = MatrixType::Random(rows, cols);
	for (int i=0; i<rows; ++i)
	while (ei_abs2(m1(i,i))<1e-3) m1(i,i) = ei_random<Scalar>();

	Transpose<MatrixType> trm4(m4);
	// test back and forward subsitution
	m3 = m1.template part<Eigen::LowerTriangular>();
	VERIFY(m3.template marked<Eigen::LowerTriangular>().solveTriangular(m3).cwise().abs().isIdentity(test_precision<RealScalar>()));
	VERIFY(m3.transpose().template marked<Eigen::UpperTriangular>()
	.solveTriangular(m3.transpose()).cwise().abs().isIdentity(test_precision<RealScalar>()));
	// check M * inv(L) using in place API
	m4 = m3;
	m3.transpose().template marked<Eigen::UpperTriangular>().solveTriangularInPlace(trm4);
	VERIFY(m4.cwise().abs().isIdentity(test_precision<RealScalar>()));

	m3 = m1.template part<Eigen::UpperTriangular>();
	VERIFY(m3.template marked<Eigen::UpperTriangular>().solveTriangular(m3).cwise().abs().isIdentity(test_precision<RealScalar>()));
	VERIFY(m3.transpose().template marked<Eigen::LowerTriangular>()
	.solveTriangular(m3.transpose()).cwise().abs().isIdentity(test_precision<RealScalar>()));
	// check M * inv(U) using in place API
	m4 = m3;
	m3.transpose().template marked<Eigen::LowerTriangular>().solveTriangularInPlace(trm4);
	VERIFY(m4.cwise().abs().isIdentity(test_precision<RealScalar>()));

	m3 = m1.template part<Eigen::UpperTriangular>();
	VERIFY(m2.isApprox(m3 * (m3.template marked<Eigen::UpperTriangular>().solveTriangular(m2)), largerEps));
	m3 = m1.template part<Eigen::LowerTriangular>();
	VERIFY(m2.isApprox(m3 * (m3.template marked<Eigen::LowerTriangular>().solveTriangular(m2)), largerEps));

	VERIFY((m1.template part<Eigen::UpperTriangular>() * m2.template part<Eigen::UpperTriangular>()).isUpperTriangular());

	// test swap
	m1.setOnes();
	m2.setZero();
	m2.template part<Eigen::UpperTriangular>().swap(m1);
	m3.setZero();
	m3.template part<Eigen::UpperTriangular>().setOnes();
	VERIFY_IS_APPROX(m2,m3);

	}

	void selfadjoint()
	{
	Matrix2i m;
	m << 1, 2,
	3, 4;

	Matrix2i m1 = Matrix2i::Zero();
	m1.part<SelfAdjoint>() = m;
	Matrix2i ref1;
	ref1 << 1, 2,
	2, 4;
	VERIFY(m1 == ref1);

	Matrix2i m2 = Matrix2i::Zero();
	m2.part<SelfAdjoint>() = m.part<UpperTriangular>();
	Matrix2i ref2;
	ref2 << 1, 2,
	2, 4;
	VERIFY(m2 == ref2);

	Matrix2i m3 = Matrix2i::Zero();
	m3.part<SelfAdjoint>() = m.part<LowerTriangular>();
	Matrix2i ref3;
	ref3 << 1, 0,
	0, 4;
	VERIFY(m3 == ref3);

	// example inspired from bug 159
	int array[] = {1, 2, 3, 4};
	Matrix2i::Map(array).part<SelfAdjoint>() = Matrix2i::Random().part<LowerTriangular>();

	std::cout << "hello\n" << array << std::endl;
	}

	void test_eigen2_triangular()
	{
	CALL_SUBTEST_8( selfadjoint() );
	for(int i = 0; i < g_repeat ; i++) {
	CALL_SUBTEST_1( triangular(Matrix<float, 1, 1>()) );
	CALL_SUBTEST_2( triangular(Matrix<float, 2, 2>()) );
	CALL_SUBTEST_3( triangular(Matrix3d()) );
	CALL_SUBTEST_4( triangular(MatrixXcf(4, 4)) );
	CALL_SUBTEST_5( triangular(Matrix<std::complex<float>,8, 8>()) );
	CALL_SUBTEST_6( triangular(MatrixXd(17,17)) );
	CALL_SUBTEST_7( triangular(Matrix<float,Dynamic,Dynamic,RowMajor>(5, 5)) );
	}
	}