test/skew_symmetric_matrix3.cpp - external/gitlab.com/libeigen/eigen - Git at Google

 // This file is part of Eigen, a lightweight C++ template library
 // for linear algebra.
 //
 // 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>

 namespace {
 template <typename Scalar>
 void constructors() {
   typedef Matrix<Scalar, 3, 1> Vector;
   const Vector v = Vector::Random();
   // l-value
   const SkewSymmetricMatrix3<Scalar> s1(v);
   const Vector& v1 = s1.vector();
   VERIFY_IS_APPROX(v1, v);
   VERIFY(s1.cols() == 3);
   VERIFY(s1.rows() == 3);

   // r-value
   const SkewSymmetricMatrix3<Scalar> s2(std::move(v));
   VERIFY_IS_APPROX(v1, s2.vector());
   VERIFY_IS_APPROX(s1.toDenseMatrix(), s2.toDenseMatrix());

   // from scalars
   SkewSymmetricMatrix3<Scalar> s4(v1(0), v1(1), v1(2));
   VERIFY_IS_APPROX(v1, s4.vector());

   // constructors with four vectors do not compile
   // Matrix<Scalar, 4, 1> vector4 = Matrix<Scalar, 4, 1>::Random();
   // SkewSymmetricMatrix3<Scalar> s5(vector4);
 }

 template <typename Scalar>
 void assignments() {
   typedef Matrix<Scalar, 3, 1> Vector;
   typedef Matrix<Scalar, 3, 3> SquareMatrix;

   const Vector v = Vector::Random();

   // assign to square matrix
   SquareMatrix sq;
   sq = v.asSkewSymmetric();
   VERIFY(sq.isSkewSymmetric());

   // assign to skew symmetric matrix
   SkewSymmetricMatrix3<Scalar> sk;
   sk = v.asSkewSymmetric();
   VERIFY_IS_APPROX(v, sk.vector());
 }

 template <typename Scalar>
 void plusMinus() {
   typedef Matrix<Scalar, 3, 1> Vector;
   typedef Matrix<Scalar, 3, 3> SquareMatrix;

   const Vector v1 = Vector::Random();
   const Vector v2 = Vector::Random();

   SquareMatrix sq1;
   sq1 = v1.asSkewSymmetric();
   SquareMatrix sq2;
   sq2 = v2.asSkewSymmetric();

   SkewSymmetricMatrix3<Scalar> sk1;
   sk1 = v1.asSkewSymmetric();
   SkewSymmetricMatrix3<Scalar> sk2;
   sk2 = v2.asSkewSymmetric();

   VERIFY_IS_APPROX((sk1 + sk2).toDenseMatrix(), sq1 + sq2);
   VERIFY_IS_APPROX((sk1 - sk2).toDenseMatrix(), sq1 - sq2);

   SquareMatrix sq3 = v1.asSkewSymmetric();
   VERIFY_IS_APPROX(sq3 = v1.asSkewSymmetric() + v2.asSkewSymmetric(), sq1 + sq2);
   VERIFY_IS_APPROX(sq3 = v1.asSkewSymmetric() - v2.asSkewSymmetric(), sq1 - sq2);
   VERIFY_IS_APPROX(sq3 = v1.asSkewSymmetric() - 2 * v2.asSkewSymmetric() + v1.asSkewSymmetric(), sq1 - 2 * sq2 + sq1);

   VERIFY_IS_APPROX((sk1 + sk1).vector(), 2 * v1);
   VERIFY((sk1 - sk1).vector().isZero());
   VERIFY((sk1 - sk1).toDenseMatrix().isZero());
 }

 template <typename Scalar>
 void multiplyScale() {
   typedef Matrix<Scalar, 3, 1> Vector;
   typedef Matrix<Scalar, 3, 3> SquareMatrix;

   const Vector v1 = Vector::Random();
   SquareMatrix sq1;
   sq1 = v1.asSkewSymmetric();
   SkewSymmetricMatrix3<Scalar> sk1;
   sk1 = v1.asSkewSymmetric();

   const Scalar s1 = internal::random<Scalar>();
   VERIFY_IS_APPROX(SkewSymmetricMatrix3<Scalar>(sk1 * s1).vector(), sk1.vector() * s1);
   VERIFY_IS_APPROX(SkewSymmetricMatrix3<Scalar>(s1 * sk1).vector(), s1 * sk1.vector());
   VERIFY_IS_APPROX(sq1 * (sk1 * s1), (sq1 * sk1) * s1);

   const Vector v2 = Vector::Random();
   SquareMatrix sq2;
   sq2 = v2.asSkewSymmetric();
   SkewSymmetricMatrix3<Scalar> sk2;
   sk2 = v2.asSkewSymmetric();
   VERIFY_IS_APPROX(sk1 * sk2, sq1 * sq2);

   // null space
   VERIFY((sk1 * v1).isZero());
   VERIFY((sk2 * v2).isZero());
 }

 template <typename Matrix>
 void skewSymmetricMultiplication(const Matrix& m) {
   typedef Eigen::Matrix<typename Matrix::Scalar, 3, 1> Vector;
   const Vector v = Vector::Random();
   const Matrix m1 = Matrix::Random(m.rows(), m.cols());
   const SkewSymmetricMatrix3<typename Matrix::Scalar> sk = v.asSkewSymmetric();
   VERIFY_IS_APPROX(m1.transpose() * (sk * m1), (m1.transpose() * sk) * m1);
   VERIFY((m1.transpose() * (sk * m1)).isSkewSymmetric());
 }

 template <typename Scalar>
 void traceAndDet() {
   typedef Matrix<Scalar, 3, 1> Vector;
   const Vector v = Vector::Random();
   // this does not work, values larger than 1.e-08 can be seen
   // VERIFY_IS_APPROX(sq.determinant(), static_cast<Scalar>(0));
   VERIFY_IS_APPROX(v.asSkewSymmetric().determinant(), static_cast<Scalar>(0));
   VERIFY_IS_APPROX(v.asSkewSymmetric().toDenseMatrix().trace(), static_cast<Scalar>(0));
 }

 template <typename Scalar>
 void transpose() {
   typedef Matrix<Scalar, 3, 1> Vector;
   const Vector v = Vector::Random();
   // By definition of a skew symmetric matrix: A^T = -A
   VERIFY_IS_APPROX(v.asSkewSymmetric().toDenseMatrix().transpose(), v.asSkewSymmetric().transpose().toDenseMatrix());
   VERIFY_IS_APPROX(v.asSkewSymmetric().transpose().vector(), (-v).asSkewSymmetric().vector());
 }

 template <typename Scalar>
 void exponentialIdentity() {
   typedef Matrix<Scalar, 3, 1> Vector;
   const Vector v1 = Vector::Zero();
   VERIFY(v1.asSkewSymmetric().exponential().isIdentity());

   Vector v2 = Vector::Random();
   v2.normalize();
   VERIFY((2 * EIGEN_PI * v2).asSkewSymmetric().exponential().isIdentity());

   Vector v3;
   const auto precision = static_cast<Scalar>(1.1) * NumTraits<Scalar>::dummy_precision();
   v3 << 0, 0, precision;
   VERIFY(v3.asSkewSymmetric().exponential().isIdentity(precision));
 }

 template <typename Scalar>
 void exponentialOrthogonality() {
   typedef Matrix<Scalar, 3, 1> Vector;
   typedef Matrix<Scalar, 3, 3> SquareMatrix;
   const Vector v = Vector::Random();
   SquareMatrix sq = v.asSkewSymmetric().exponential();
   VERIFY(sq.isUnitary());
 }

 template <typename Scalar>
 void exponentialRotation() {
   typedef Matrix<Scalar, 3, 1> Vector;
   typedef Matrix<Scalar, 3, 3> SquareMatrix;

   // rotation axis is invariant
   const Vector v1 = Vector::Random();
   const SquareMatrix r1 = v1.asSkewSymmetric().exponential();
   VERIFY_IS_APPROX(r1 * v1, v1);

   // rotate around z-axis
   Vector v2;
   v2 << 0, 0, Scalar(EIGEN_PI);
   const SquareMatrix r2 = v2.asSkewSymmetric().exponential();
   VERIFY_IS_APPROX(r2 * (Vector() << 1, 0, 0).finished(), (Vector() << -1, 0, 0).finished());
   VERIFY_IS_APPROX(r2 * (Vector() << 0, 1, 0).finished(), (Vector() << 0, -1, 0).finished());
 }

 }  // namespace

 EIGEN_DECLARE_TEST(skew_symmetric_matrix3) {
   for (int i = 0; i < g_repeat; i++) {
     CALL_SUBTEST_1(constructors<float>());
     CALL_SUBTEST_1(constructors<double>());
     CALL_SUBTEST_1(assignments<float>());
     CALL_SUBTEST_1(assignments<double>());

     CALL_SUBTEST_2(plusMinus<float>());
     CALL_SUBTEST_2(plusMinus<double>());
     CALL_SUBTEST_2(multiplyScale<float>());
     CALL_SUBTEST_2(multiplyScale<double>());
     CALL_SUBTEST_2(skewSymmetricMultiplication(MatrixXf(3, internal::random<int>(3, EIGEN_TEST_MAX_SIZE))));
     CALL_SUBTEST_2(skewSymmetricMultiplication(MatrixXd(3, internal::random<int>(3, EIGEN_TEST_MAX_SIZE))));
     CALL_SUBTEST_2(traceAndDet<float>());
     CALL_SUBTEST_2(traceAndDet<double>());
     CALL_SUBTEST_2(transpose<float>());
     CALL_SUBTEST_2(transpose<double>());

     CALL_SUBTEST_3(exponentialIdentity<float>());
     CALL_SUBTEST_3(exponentialIdentity<double>());
     CALL_SUBTEST_3(exponentialOrthogonality<float>());
     CALL_SUBTEST_3(exponentialOrthogonality<double>());
     CALL_SUBTEST_3(exponentialRotation<float>());
     CALL_SUBTEST_3(exponentialRotation<double>());
   }
 }
	// This file is part of Eigen, a lightweight C++ template library
	// for linear algebra.
	//
	// 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>

	namespace {
	template <typename Scalar>
	void constructors() {
	typedef Matrix<Scalar, 3, 1> Vector;
	const Vector v = Vector::Random();
	// l-value
	const SkewSymmetricMatrix3<Scalar> s1(v);
	const Vector& v1 = s1.vector();
	VERIFY_IS_APPROX(v1, v);
	VERIFY(s1.cols() == 3);
	VERIFY(s1.rows() == 3);

	// r-value
	const SkewSymmetricMatrix3<Scalar> s2(std::move(v));
	VERIFY_IS_APPROX(v1, s2.vector());
	VERIFY_IS_APPROX(s1.toDenseMatrix(), s2.toDenseMatrix());

	// from scalars
	SkewSymmetricMatrix3<Scalar> s4(v1(0), v1(1), v1(2));
	VERIFY_IS_APPROX(v1, s4.vector());

	// constructors with four vectors do not compile
	// Matrix<Scalar, 4, 1> vector4 = Matrix<Scalar, 4, 1>::Random();
	// SkewSymmetricMatrix3<Scalar> s5(vector4);
	}

	template <typename Scalar>
	void assignments() {
	typedef Matrix<Scalar, 3, 1> Vector;
	typedef Matrix<Scalar, 3, 3> SquareMatrix;

	const Vector v = Vector::Random();

	// assign to square matrix
	SquareMatrix sq;
	sq = v.asSkewSymmetric();
	VERIFY(sq.isSkewSymmetric());

	// assign to skew symmetric matrix
	SkewSymmetricMatrix3<Scalar> sk;
	sk = v.asSkewSymmetric();
	VERIFY_IS_APPROX(v, sk.vector());
	}

	template <typename Scalar>
	void plusMinus() {
	typedef Matrix<Scalar, 3, 1> Vector;
	typedef Matrix<Scalar, 3, 3> SquareMatrix;

	const Vector v1 = Vector::Random();
	const Vector v2 = Vector::Random();

	SquareMatrix sq1;
	sq1 = v1.asSkewSymmetric();
	SquareMatrix sq2;
	sq2 = v2.asSkewSymmetric();

	SkewSymmetricMatrix3<Scalar> sk1;
	sk1 = v1.asSkewSymmetric();
	SkewSymmetricMatrix3<Scalar> sk2;
	sk2 = v2.asSkewSymmetric();

	VERIFY_IS_APPROX((sk1 + sk2).toDenseMatrix(), sq1 + sq2);
	VERIFY_IS_APPROX((sk1 - sk2).toDenseMatrix(), sq1 - sq2);

	SquareMatrix sq3 = v1.asSkewSymmetric();
	VERIFY_IS_APPROX(sq3 = v1.asSkewSymmetric() + v2.asSkewSymmetric(), sq1 + sq2);
	VERIFY_IS_APPROX(sq3 = v1.asSkewSymmetric() - v2.asSkewSymmetric(), sq1 - sq2);
	VERIFY_IS_APPROX(sq3 = v1.asSkewSymmetric() - 2 * v2.asSkewSymmetric() + v1.asSkewSymmetric(), sq1 - 2 * sq2 + sq1);

	VERIFY_IS_APPROX((sk1 + sk1).vector(), 2 * v1);
	VERIFY((sk1 - sk1).vector().isZero());
	VERIFY((sk1 - sk1).toDenseMatrix().isZero());
	}

	template <typename Scalar>
	void multiplyScale() {
	typedef Matrix<Scalar, 3, 1> Vector;
	typedef Matrix<Scalar, 3, 3> SquareMatrix;

	const Vector v1 = Vector::Random();
	SquareMatrix sq1;
	sq1 = v1.asSkewSymmetric();
	SkewSymmetricMatrix3<Scalar> sk1;
	sk1 = v1.asSkewSymmetric();

	const Scalar s1 = internal::random<Scalar>();
	VERIFY_IS_APPROX(SkewSymmetricMatrix3<Scalar>(sk1 * s1).vector(), sk1.vector() * s1);
	VERIFY_IS_APPROX(SkewSymmetricMatrix3<Scalar>(s1 * sk1).vector(), s1 * sk1.vector());
	VERIFY_IS_APPROX(sq1 * (sk1 * s1), (sq1 * sk1) * s1);

	const Vector v2 = Vector::Random();
	SquareMatrix sq2;
	sq2 = v2.asSkewSymmetric();
	SkewSymmetricMatrix3<Scalar> sk2;
	sk2 = v2.asSkewSymmetric();
	VERIFY_IS_APPROX(sk1 * sk2, sq1 * sq2);

	// null space
	VERIFY((sk1 * v1).isZero());
	VERIFY((sk2 * v2).isZero());
	}

	template <typename Matrix>
	void skewSymmetricMultiplication(const Matrix& m) {
	typedef Eigen::Matrix<typename Matrix::Scalar, 3, 1> Vector;
	const Vector v = Vector::Random();
	const Matrix m1 = Matrix::Random(m.rows(), m.cols());
	const SkewSymmetricMatrix3<typename Matrix::Scalar> sk = v.asSkewSymmetric();
	VERIFY_IS_APPROX(m1.transpose() * (sk * m1), (m1.transpose() * sk) * m1);
	VERIFY((m1.transpose() * (sk * m1)).isSkewSymmetric());
	}

	template <typename Scalar>
	void traceAndDet() {
	typedef Matrix<Scalar, 3, 1> Vector;
	const Vector v = Vector::Random();
	// this does not work, values larger than 1.e-08 can be seen
	// VERIFY_IS_APPROX(sq.determinant(), static_cast<Scalar>(0));
	VERIFY_IS_APPROX(v.asSkewSymmetric().determinant(), static_cast<Scalar>(0));
	VERIFY_IS_APPROX(v.asSkewSymmetric().toDenseMatrix().trace(), static_cast<Scalar>(0));
	}

	template <typename Scalar>
	void transpose() {
	typedef Matrix<Scalar, 3, 1> Vector;
	const Vector v = Vector::Random();
	// By definition of a skew symmetric matrix: A^T = -A
	VERIFY_IS_APPROX(v.asSkewSymmetric().toDenseMatrix().transpose(), v.asSkewSymmetric().transpose().toDenseMatrix());
	VERIFY_IS_APPROX(v.asSkewSymmetric().transpose().vector(), (-v).asSkewSymmetric().vector());
	}

	template <typename Scalar>
	void exponentialIdentity() {
	typedef Matrix<Scalar, 3, 1> Vector;
	const Vector v1 = Vector::Zero();
	VERIFY(v1.asSkewSymmetric().exponential().isIdentity());

	Vector v2 = Vector::Random();
	v2.normalize();
	VERIFY((2 * EIGEN_PI * v2).asSkewSymmetric().exponential().isIdentity());

	Vector v3;
	const auto precision = static_cast<Scalar>(1.1) * NumTraits<Scalar>::dummy_precision();
	v3 << 0, 0, precision;
	VERIFY(v3.asSkewSymmetric().exponential().isIdentity(precision));
	}

	template <typename Scalar>
	void exponentialOrthogonality() {
	typedef Matrix<Scalar, 3, 1> Vector;
	typedef Matrix<Scalar, 3, 3> SquareMatrix;
	const Vector v = Vector::Random();
	SquareMatrix sq = v.asSkewSymmetric().exponential();
	VERIFY(sq.isUnitary());
	}

	template <typename Scalar>
	void exponentialRotation() {
	typedef Matrix<Scalar, 3, 1> Vector;
	typedef Matrix<Scalar, 3, 3> SquareMatrix;

	// rotation axis is invariant
	const Vector v1 = Vector::Random();
	const SquareMatrix r1 = v1.asSkewSymmetric().exponential();
	VERIFY_IS_APPROX(r1 * v1, v1);

	// rotate around z-axis
	Vector v2;
	v2 << 0, 0, Scalar(EIGEN_PI);
	const SquareMatrix r2 = v2.asSkewSymmetric().exponential();
	VERIFY_IS_APPROX(r2 * (Vector() << 1, 0, 0).finished(), (Vector() << -1, 0, 0).finished());
	VERIFY_IS_APPROX(r2 * (Vector() << 0, 1, 0).finished(), (Vector() << 0, -1, 0).finished());
	}

	} // namespace

	EIGEN_DECLARE_TEST(skew_symmetric_matrix3) {
	for (int i = 0; i < g_repeat; i++) {
	CALL_SUBTEST_1(constructors<float>());
	CALL_SUBTEST_1(constructors<double>());
	CALL_SUBTEST_1(assignments<float>());
	CALL_SUBTEST_1(assignments<double>());

	CALL_SUBTEST_2(plusMinus<float>());
	CALL_SUBTEST_2(plusMinus<double>());
	CALL_SUBTEST_2(multiplyScale<float>());
	CALL_SUBTEST_2(multiplyScale<double>());
	CALL_SUBTEST_2(skewSymmetricMultiplication(MatrixXf(3, internal::random<int>(3, EIGEN_TEST_MAX_SIZE))));
	CALL_SUBTEST_2(skewSymmetricMultiplication(MatrixXd(3, internal::random<int>(3, EIGEN_TEST_MAX_SIZE))));
	CALL_SUBTEST_2(traceAndDet<float>());
	CALL_SUBTEST_2(traceAndDet<double>());
	CALL_SUBTEST_2(transpose<float>());
	CALL_SUBTEST_2(transpose<double>());

	CALL_SUBTEST_3(exponentialIdentity<float>());
	CALL_SUBTEST_3(exponentialIdentity<double>());
	CALL_SUBTEST_3(exponentialOrthogonality<float>());
	CALL_SUBTEST_3(exponentialOrthogonality<double>());
	CALL_SUBTEST_3(exponentialRotation<float>());
	CALL_SUBTEST_3(exponentialRotation<double>());
	}
	}