eigen/unsupported/test/EulerAngles.cpp

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// This file is part of Eigen, a lightweight C++ template library
// for linear algebra.
//
// Copyright (C) 2015 Tal Hadad <tal_hd@hotmail.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 <unsupported/Eigen/EulerAngles>
using namespace Eigen;
template<typename EulerSystem, typename Scalar>
void verify_euler_ranged(const Matrix<Scalar,3,1>& ea,
bool positiveRangeAlpha, bool positiveRangeBeta, bool positiveRangeGamma)
{
typedef EulerAngles<Scalar, EulerSystem> EulerAnglesType;
typedef Matrix<Scalar,3,3> Matrix3;
typedef Matrix<Scalar,3,1> Vector3;
typedef Quaternion<Scalar> QuaternionType;
typedef AngleAxis<Scalar> AngleAxisType;
using std::abs;
Scalar alphaRangeStart, alphaRangeEnd;
Scalar betaRangeStart, betaRangeEnd;
Scalar gammaRangeStart, gammaRangeEnd;
if (positiveRangeAlpha)
{
alphaRangeStart = Scalar(0);
alphaRangeEnd = Scalar(2 * EIGEN_PI);
}
else
{
alphaRangeStart = -Scalar(EIGEN_PI);
alphaRangeEnd = Scalar(EIGEN_PI);
}
if (positiveRangeBeta)
{
betaRangeStart = Scalar(0);
betaRangeEnd = Scalar(2 * EIGEN_PI);
}
else
{
betaRangeStart = -Scalar(EIGEN_PI);
betaRangeEnd = Scalar(EIGEN_PI);
}
if (positiveRangeGamma)
{
gammaRangeStart = Scalar(0);
gammaRangeEnd = Scalar(2 * EIGEN_PI);
}
else
{
gammaRangeStart = -Scalar(EIGEN_PI);
gammaRangeEnd = Scalar(EIGEN_PI);
}
const int i = EulerSystem::AlphaAxisAbs - 1;
const int j = EulerSystem::BetaAxisAbs - 1;
const int k = EulerSystem::GammaAxisAbs - 1;
const int iFactor = EulerSystem::IsAlphaOpposite ? -1 : 1;
const int jFactor = EulerSystem::IsBetaOpposite ? -1 : 1;
const int kFactor = EulerSystem::IsGammaOpposite ? -1 : 1;
const Vector3 I = EulerAnglesType::AlphaAxisVector();
const Vector3 J = EulerAnglesType::BetaAxisVector();
const Vector3 K = EulerAnglesType::GammaAxisVector();
EulerAnglesType e(ea[0], ea[1], ea[2]);
Matrix3 m(e);
Vector3 eabis = EulerAnglesType(m, positiveRangeAlpha, positiveRangeBeta, positiveRangeGamma).angles();
// Check that eabis in range
VERIFY(alphaRangeStart <= eabis[0] && eabis[0] <= alphaRangeEnd);
VERIFY(betaRangeStart <= eabis[1] && eabis[1] <= betaRangeEnd);
VERIFY(gammaRangeStart <= eabis[2] && eabis[2] <= gammaRangeEnd);
Vector3 eabis2 = m.eulerAngles(i, j, k);
// Invert the relevant axes
eabis2[0] *= iFactor;
eabis2[1] *= jFactor;
eabis2[2] *= kFactor;
// Saturate the angles to the correct range
if (positiveRangeAlpha && (eabis2[0] < 0))
eabis2[0] += Scalar(2 * EIGEN_PI);
if (positiveRangeBeta && (eabis2[1] < 0))
eabis2[1] += Scalar(2 * EIGEN_PI);
if (positiveRangeGamma && (eabis2[2] < 0))
eabis2[2] += Scalar(2 * EIGEN_PI);
VERIFY_IS_APPROX(eabis, eabis2);// Verify that our estimation is the same as m.eulerAngles() is
Matrix3 mbis(AngleAxisType(eabis[0], I) * AngleAxisType(eabis[1], J) * AngleAxisType(eabis[2], K));
VERIFY_IS_APPROX(m, mbis);
// Tests that are only relevant for no possitive range
if (!(positiveRangeAlpha || positiveRangeBeta || positiveRangeGamma))
{
/* If I==K, and ea[1]==0, then there no unique solution. */
/* The remark apply in the case where I!=K, and |ea[1]| is close to pi/2. */
if( (i!=k || ea[1]!=0) && (i==k || !internal::isApprox(abs(ea[1]),Scalar(EIGEN_PI/2),test_precision<Scalar>())) )
VERIFY((ea-eabis).norm() <= test_precision<Scalar>());
// approx_or_less_than does not work for 0
VERIFY(0 < eabis[0] || test_isMuchSmallerThan(eabis[0], Scalar(1)));
}
// Quaternions
QuaternionType q(e);
eabis = EulerAnglesType(q, positiveRangeAlpha, positiveRangeBeta, positiveRangeGamma).angles();
VERIFY_IS_APPROX(eabis, eabis2);// Verify that the euler angles are still the same
}
template<typename EulerSystem, typename Scalar>
void verify_euler(const Matrix<Scalar,3,1>& ea)
{
verify_euler_ranged<EulerSystem>(ea, false, false, false);
verify_euler_ranged<EulerSystem>(ea, false, false, true);
verify_euler_ranged<EulerSystem>(ea, false, true, false);
verify_euler_ranged<EulerSystem>(ea, false, true, true);
verify_euler_ranged<EulerSystem>(ea, true, false, false);
verify_euler_ranged<EulerSystem>(ea, true, false, true);
verify_euler_ranged<EulerSystem>(ea, true, true, false);
verify_euler_ranged<EulerSystem>(ea, true, true, true);
}
template<typename Scalar> void check_all_var(const Matrix<Scalar,3,1>& ea)
{
verify_euler<EulerSystemXYZ>(ea);
verify_euler<EulerSystemXYX>(ea);
verify_euler<EulerSystemXZY>(ea);
verify_euler<EulerSystemXZX>(ea);
verify_euler<EulerSystemYZX>(ea);
verify_euler<EulerSystemYZY>(ea);
verify_euler<EulerSystemYXZ>(ea);
verify_euler<EulerSystemYXY>(ea);
verify_euler<EulerSystemZXY>(ea);
verify_euler<EulerSystemZXZ>(ea);
verify_euler<EulerSystemZYX>(ea);
verify_euler<EulerSystemZYZ>(ea);
}
template<typename Scalar> void eulerangles()
{
typedef Matrix<Scalar,3,3> Matrix3;
typedef Matrix<Scalar,3,1> Vector3;
typedef Array<Scalar,3,1> Array3;
typedef Quaternion<Scalar> Quaternionx;
typedef AngleAxis<Scalar> AngleAxisType;
Scalar a = internal::random<Scalar>(-Scalar(EIGEN_PI), Scalar(EIGEN_PI));
Quaternionx q1;
q1 = AngleAxisType(a, Vector3::Random().normalized());
Matrix3 m;
m = q1;
Vector3 ea = m.eulerAngles(0,1,2);
check_all_var(ea);
ea = m.eulerAngles(0,1,0);
check_all_var(ea);
// Check with purely random Quaternion:
q1.coeffs() = Quaternionx::Coefficients::Random().normalized();
m = q1;
ea = m.eulerAngles(0,1,2);
check_all_var(ea);
ea = m.eulerAngles(0,1,0);
check_all_var(ea);
// Check with random angles in range [0:pi]x[-pi:pi]x[-pi:pi].
ea = (Array3::Random() + Array3(1,0,0))*Scalar(EIGEN_PI)*Array3(0.5,1,1);
check_all_var(ea);
ea[2] = ea[0] = internal::random<Scalar>(0,Scalar(EIGEN_PI));
check_all_var(ea);
ea[0] = ea[1] = internal::random<Scalar>(0,Scalar(EIGEN_PI));
check_all_var(ea);
ea[1] = 0;
check_all_var(ea);
ea.head(2).setZero();
check_all_var(ea);
ea.setZero();
check_all_var(ea);
}
void test_EulerAngles()
{
for(int i = 0; i < g_repeat; i++) {
CALL_SUBTEST_1( eulerangles<float>() );
CALL_SUBTEST_2( eulerangles<double>() );
}
}