test/schur_real.cpp - eigen - Git at Google

 // This file is part of Eigen, a lightweight C++ template library
 // for linear algebra.
 //
 // Copyright (C) 2010,2012 Jitse Niesen <jitse@maths.leeds.ac.uk>
 //
 // 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 <limits>
 #include <Eigen/Eigenvalues>

 template<typename MatrixType> void verifyIsQuasiTriangular(const MatrixType& T)
 {
   const Index size = T.cols();
   typedef typename MatrixType::Scalar Scalar;

   // Check T is lower Hessenberg
   for(int row = 2; row < size; ++row) {
     for(int col = 0; col < row - 1; ++col) {
       VERIFY(T(row,col) == Scalar(0));
     }
   }

   // Check that any non-zero on the subdiagonal is followed by a zero and is
   // part of a 2x2 diagonal block with imaginary eigenvalues.
   for(int row = 1; row < size; ++row) {
     if (T(row,row-1) != Scalar(0)) {
       VERIFY(row == size-1 || T(row+1,row) == 0);
       Scalar tr = T(row-1,row-1) + T(row,row);
       Scalar det = T(row-1,row-1) * T(row,row) - T(row-1,row) * T(row,row-1);
       VERIFY(4 * det > tr * tr);
     }
   }
 }

 template<typename MatrixType> void schur(int size = MatrixType::ColsAtCompileTime)
 {
   // Test basic functionality: T is quasi-triangular and A = U T U*
   for(int counter = 0; counter < g_repeat; ++counter) {
     MatrixType A = MatrixType::Random(size, size);
     RealSchur<MatrixType> schurOfA(A);
     VERIFY_IS_EQUAL(schurOfA.info(), Success);
     MatrixType U = schurOfA.matrixU();
     MatrixType T = schurOfA.matrixT();
     verifyIsQuasiTriangular(T);
     VERIFY_IS_APPROX(A, U * T * U.transpose());
   }

   // Test asserts when not initialized
   RealSchur<MatrixType> rsUninitialized;
   VERIFY_RAISES_ASSERT(rsUninitialized.matrixT());
   VERIFY_RAISES_ASSERT(rsUninitialized.matrixU());
   VERIFY_RAISES_ASSERT(rsUninitialized.info());

   // Test whether compute() and constructor returns same result
   MatrixType A = MatrixType::Random(size, size);
   RealSchur<MatrixType> rs1;
   rs1.compute(A);
   RealSchur<MatrixType> rs2(A);
   VERIFY_IS_EQUAL(rs1.info(), Success);
   VERIFY_IS_EQUAL(rs2.info(), Success);
   VERIFY_IS_EQUAL(rs1.matrixT(), rs2.matrixT());
   VERIFY_IS_EQUAL(rs1.matrixU(), rs2.matrixU());

   // Test maximum number of iterations
   RealSchur<MatrixType> rs3;
   rs3.setMaxIterations(RealSchur<MatrixType>::m_maxIterationsPerRow * size).compute(A);
   VERIFY_IS_EQUAL(rs3.info(), Success);
   VERIFY_IS_EQUAL(rs3.matrixT(), rs1.matrixT());
   VERIFY_IS_EQUAL(rs3.matrixU(), rs1.matrixU());
   if (size > 2) {
     rs3.setMaxIterations(1).compute(A);
     VERIFY_IS_EQUAL(rs3.info(), NoConvergence);
     VERIFY_IS_EQUAL(rs3.getMaxIterations(), 1);
   }

   MatrixType Atriangular = A;
   Atriangular.template triangularView<StrictlyLower>().setZero();
   rs3.setMaxIterations(1).compute(Atriangular); // triangular matrices do not need any iterations
   VERIFY_IS_EQUAL(rs3.info(), Success);
   VERIFY_IS_APPROX(rs3.matrixT(), Atriangular); // approx because of scaling...
   VERIFY_IS_EQUAL(rs3.matrixU(), MatrixType::Identity(size, size));

   // Test computation of only T, not U
   RealSchur<MatrixType> rsOnlyT(A, false);
   VERIFY_IS_EQUAL(rsOnlyT.info(), Success);
   VERIFY_IS_EQUAL(rs1.matrixT(), rsOnlyT.matrixT());
   VERIFY_RAISES_ASSERT(rsOnlyT.matrixU());

   if (size > 2 && size < 20)
   {
     // Test matrix with NaN
     A(0,0) = std::numeric_limits<typename MatrixType::Scalar>::quiet_NaN();
     RealSchur<MatrixType> rsNaN(A);
     VERIFY_IS_EQUAL(rsNaN.info(), NoConvergence);
   }
 }

 EIGEN_DECLARE_TEST(schur_real)
 {
   CALL_SUBTEST_1(( schur<Matrix4f>() ));
   CALL_SUBTEST_2(( schur<MatrixXd>(internal::random<int>(1,EIGEN_TEST_MAX_SIZE/4)) ));
   CALL_SUBTEST_3(( schur<Matrix<float, 1, 1> >() ));
   CALL_SUBTEST_4(( schur<Matrix<double, 3, 3, Eigen::RowMajor> >() ));

   // Test problem size constructors
   CALL_SUBTEST_5(RealSchur<MatrixXf>(10));
 }
	// This file is part of Eigen, a lightweight C++ template library
	// for linear algebra.
	//
	// Copyright (C) 2010,2012 Jitse Niesen <jitse@maths.leeds.ac.uk>
	//
	// 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 <limits>
	#include <Eigen/Eigenvalues>

	template<typename MatrixType> void verifyIsQuasiTriangular(const MatrixType& T)
	{
	const Index size = T.cols();
	typedef typename MatrixType::Scalar Scalar;

	// Check T is lower Hessenberg
	for(int row = 2; row < size; ++row) {
	for(int col = 0; col < row - 1; ++col) {
	VERIFY(T(row,col) == Scalar(0));
	}
	}

	// Check that any non-zero on the subdiagonal is followed by a zero and is
	// part of a 2x2 diagonal block with imaginary eigenvalues.
	for(int row = 1; row < size; ++row) {
	if (T(row,row-1) != Scalar(0)) {
	VERIFY(row == size-1 \|\| T(row+1,row) == 0);
	Scalar tr = T(row-1,row-1) + T(row,row);
	Scalar det = T(row-1,row-1) * T(row,row) - T(row-1,row) * T(row,row-1);
	VERIFY(4 * det > tr * tr);
	}
	}
	}

	template<typename MatrixType> void schur(int size = MatrixType::ColsAtCompileTime)
	{
	// Test basic functionality: T is quasi-triangular and A = U T U*
	for(int counter = 0; counter < g_repeat; ++counter) {
	MatrixType A = MatrixType::Random(size, size);
	RealSchur<MatrixType> schurOfA(A);
	VERIFY_IS_EQUAL(schurOfA.info(), Success);
	MatrixType U = schurOfA.matrixU();
	MatrixType T = schurOfA.matrixT();
	verifyIsQuasiTriangular(T);
	VERIFY_IS_APPROX(A, U * T * U.transpose());
	}

	// Test asserts when not initialized
	RealSchur<MatrixType> rsUninitialized;
	VERIFY_RAISES_ASSERT(rsUninitialized.matrixT());
	VERIFY_RAISES_ASSERT(rsUninitialized.matrixU());
	VERIFY_RAISES_ASSERT(rsUninitialized.info());

	// Test whether compute() and constructor returns same result
	MatrixType A = MatrixType::Random(size, size);
	RealSchur<MatrixType> rs1;
	rs1.compute(A);
	RealSchur<MatrixType> rs2(A);
	VERIFY_IS_EQUAL(rs1.info(), Success);
	VERIFY_IS_EQUAL(rs2.info(), Success);
	VERIFY_IS_EQUAL(rs1.matrixT(), rs2.matrixT());
	VERIFY_IS_EQUAL(rs1.matrixU(), rs2.matrixU());

	// Test maximum number of iterations
	RealSchur<MatrixType> rs3;
	rs3.setMaxIterations(RealSchur<MatrixType>::m_maxIterationsPerRow * size).compute(A);
	VERIFY_IS_EQUAL(rs3.info(), Success);
	VERIFY_IS_EQUAL(rs3.matrixT(), rs1.matrixT());
	VERIFY_IS_EQUAL(rs3.matrixU(), rs1.matrixU());
	if (size > 2) {
	rs3.setMaxIterations(1).compute(A);
	VERIFY_IS_EQUAL(rs3.info(), NoConvergence);
	VERIFY_IS_EQUAL(rs3.getMaxIterations(), 1);
	}

	MatrixType Atriangular = A;
	Atriangular.template triangularView<StrictlyLower>().setZero();
	rs3.setMaxIterations(1).compute(Atriangular); // triangular matrices do not need any iterations
	VERIFY_IS_EQUAL(rs3.info(), Success);
	VERIFY_IS_APPROX(rs3.matrixT(), Atriangular); // approx because of scaling...
	VERIFY_IS_EQUAL(rs3.matrixU(), MatrixType::Identity(size, size));

	// Test computation of only T, not U
	RealSchur<MatrixType> rsOnlyT(A, false);
	VERIFY_IS_EQUAL(rsOnlyT.info(), Success);
	VERIFY_IS_EQUAL(rs1.matrixT(), rsOnlyT.matrixT());
	VERIFY_RAISES_ASSERT(rsOnlyT.matrixU());

	if (size > 2 && size < 20)
	{
	// Test matrix with NaN
	A(0,0) = std::numeric_limits<typename MatrixType::Scalar>::quiet_NaN();
	RealSchur<MatrixType> rsNaN(A);
	VERIFY_IS_EQUAL(rsNaN.info(), NoConvergence);
	}
	}

	EIGEN_DECLARE_TEST(schur_real)
	{
	CALL_SUBTEST_1(( schur<Matrix4f>() ));
	CALL_SUBTEST_2(( schur<MatrixXd>(internal::random<int>(1,EIGEN_TEST_MAX_SIZE/4)) ));
	CALL_SUBTEST_3(( schur<Matrix<float, 1, 1> >() ));
	CALL_SUBTEST_4(( schur<Matrix<double, 3, 3, Eigen::RowMajor> >() ));

	// Test problem size constructors
	CALL_SUBTEST_5(RealSchur<MatrixXf>(10));
	}