Datasets:

introvoyz041
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mujoco

	// Copyright 2022 DeepMind Technologies Limited
	//
	// Licensed under the Apache License, Version 2.0 (the "License");
	// you may not use this file except in compliance with the License.
	// You may obtain a copy of the License at
	//
	// http://www.apache.org/licenses/LICENSE-2.0
	//
	// Unless required by applicable law or agreed to in writing, software
	// distributed under the License is distributed on an "AS IS" BASIS,
	// WITHOUT WARRANTIES OR CONDITIONS OF ANY KIND, either express or implied.
	// See the License for the specific language governing permissions and
	// limitations under the License.

	// Tests for engine/engine_util_spatial.c

	#include <cmath>
	#include <cstdlib>

	#include <gmock/gmock.h>
	#include <gtest/gtest.h>
	#include <gtest/gtest-spi.h>
	#include <mujoco/mjmodel.h>
	#include <mujoco/mjtnum.h>
	#include <mujoco/mujoco.h>
	#include "src/engine/engine_util_blas.h"
	#include "src/engine/engine_util_spatial.h"
	#include "test/fixture.h"

	namespace mujoco {
	namespace {

	using ::testing::DoubleNear;
	using ::testing::ElementsAre;
	using ::testing::Pointwise;

	using Quat2MatTest = MujocoTest;

	TEST_F(Quat2MatTest, NoRotation) {
	mjtNum result[9] = {0};
	mjtNum quat[] = {1, 0, 0, 0};
	mju_quat2Mat(result, quat);
	EXPECT_THAT(
	AsVector(result, 9),
	ElementsAre(1, 0, 0,
	0, 1, 0,
	0, 0, 1)
	);
	}

	TEST_F(Quat2MatTest, TinyRotation) {
	mjtNum result[9] = {0};
	// An angle so small that cos(angle) == 1.0 to double accuracy
	mjtNum angle = 1e-8;
	mjtNum quat[] = {cos(angle/2), sin(angle/2), 0, 0};
	mju_quat2Mat(result, quat);
	EXPECT_THAT(
	AsVector(result, 9),
	ElementsAre(1, 0 , 0 ,
	0, cos(angle), -sin(angle),
	0, sin(angle), cos(angle))
	);
	}

	using MulQuatTest = MujocoTest;

	TEST_F(MulQuatTest, TinyRotation) {
	mjtNum null_quat[4] = {1, 0, 0, 0};
	mjtNum result[4];
	// An angle so small that cos(angle) == 1.0 to double accuracy
	mjtNum angle = 1e-8;
	mjtNum quat[] = {cos(angle/2), sin(angle/2), 0, 0};
	mju_mulQuat(result, null_quat, quat);
	EXPECT_THAT(
	AsVector(result, 4),
	ElementsAre(cos(angle/2), sin(angle/2), 0, 0)
	);
	}

	using RotVecQuatTest = MujocoTest;

	TEST_F(RotVecQuatTest, NoRotation) {
	mjtNum result[3];
	mjtNum vec[] = {1, 2, 3};
	mjtNum quat[] = {1, 0, 0, 0};
	mju_rotVecQuat(result, vec, quat);
	EXPECT_THAT(
	AsVector(result, 3),
	ElementsAre(1, 2, 3)
	);
	}

	TEST_F(RotVecQuatTest, TinyRotation) {
	mjtNum result[3];
	mjtNum vec[] = {0, 1, 0};
	// An angle so small that cos(angle) == 1.0 to double accuracy
	mjtNum angle = 1e-8;
	mjtNum quat[] = {cos(angle/2), sin(angle/2), 0, 0};
	mju_rotVecQuat(result, vec, quat);
	EXPECT_THAT(
	AsVector(result, 3),
	ElementsAre(0, cos(angle), sin(angle))
	);
	}

	// Rotate a vector by explicitly converting the quaternion to a 3x3 matrix
	void RotVecQuatWithMatrix(mjtNum res[3], const mjtNum vec[3],
	const mjtNum quat[4]) {
	if (quat[0] == 1 && quat[1] == 0 && quat[2] == 0 && quat[3] == 0) {
	mju_copy3(res, vec);
	} else {
	mjtNum mat[9];
	mju_quat2Mat(mat, quat);
	mju_mulMatVec3(res, mat, vec);
	}
	}

	TEST_F(RotVecQuatTest, TestEquivalence) {
	mjtNum resultActual[3], resultExpected[3], quat[4];
	// List of rotation axes
	mjtNum vecs[5][3] = {
	{1, 0, 0}, {0, 1, 0}, {0, 0, 1}, {-0.5, 1, -0.5}, {1.22, -2.33, 3.44}};
	// List of angles to rotate by, in degrees
	mjtNum angles[6] = {0.0, 1e-8, 31, 47, 181, 271};
	static const mjtNum eps = 1e-15;
	for (auto vec : vecs) {
	// Unit-normalize the vector
	mju_normalize3(vec);
	for (auto angleDegree : angles) {
	// Convert the axis-angle to a quaternion
	auto angleRad = angleDegree * mjPI / 180;
	mju_axisAngle2Quat(quat, vec, angleRad);
	// Rotate
	mju_rotVecQuat(resultActual, vec, quat);
	RotVecQuatWithMatrix(resultExpected, vec, quat);
	// Compare
	EXPECT_NEAR(resultExpected[0], resultActual[0], eps);
	EXPECT_NEAR(resultExpected[1], resultActual[1], eps);
	EXPECT_NEAR(resultExpected[2], resultActual[2], eps);
	}
	}
	}

	using Euler2QuatTest = MujocoTest;

	TEST_F(Euler2QuatTest, BadSeq) {
	EXPECT_FATAL_FAILURE({
	mjtNum quat[4];
	mjtNum euler[3] = {0};
	char seq[] = "xiz";
	mju_euler2Quat(quat, euler, seq);
	}, "mju_euler2Quat: seq[1] is 'i', should be one of x, y, z, X, Y, Z");
	}

	TEST_F(Euler2QuatTest, BadSeqLength) {
	EXPECT_FATAL_FAILURE({
	mjtNum quat[4];
	mjtNum euler[3] = {0};
	char seq[] = "xyzy";
	mju_euler2Quat(quat, euler, seq);
	}, "mju_euler2Quat: seq must contain exactly 3 characters");
	}

	TEST_F(Euler2QuatTest, Euler2Quat) {
	mjtNum quat[4] = {0};
	mjtNum tol = 1e-14;

	char seq[] = "xyz";
	mjtNum euler[3] = {mjPI, 0, 0};
	mjtNum expected[4] = {0, 1, 0, 0};
	mju_euler2Quat(quat, euler, seq);
	EXPECT_THAT(quat, Pointwise(DoubleNear(tol), expected));

	euler[1] = mjPI;
	mjtNum expected2[4] = {0, 0, 0, 1};
	mju_euler2Quat(quat, euler, seq);
	EXPECT_THAT(quat, Pointwise(DoubleNear(tol), expected2));

	char seq2[] = "XYZ";
	mjtNum expected3[4] = {0, 0, 0, -1};
	mju_euler2Quat(quat, euler, seq2);
	EXPECT_THAT(quat, Pointwise(DoubleNear(tol), expected3));

	mjtNum euler2[3] = {2mjPI, 2mjPI, 2*mjPI};
	mjtNum expected4[4] = {-1, 0, 0, 0};
	mju_euler2Quat(quat, euler2, seq);
	EXPECT_THAT(quat, Pointwise(DoubleNear(tol), expected4));
	mju_euler2Quat(quat, euler2, seq2);
	EXPECT_THAT(quat, Pointwise(DoubleNear(tol), expected4));

	mjtNum euler3[3] = {mjPI/2, mjPI/2, mjPI/2};
	mjtNum expected5[4] = {0, mju_sqrt(.5), 0, mju_sqrt(.5)};
	mju_euler2Quat(quat, euler3, seq);
	EXPECT_THAT(quat, Pointwise(DoubleNear(tol), expected5));
	mju_euler2Quat(quat, euler3, seq2);
	mjtNum expected6[4] = {mju_sqrt(.5), 0, mju_sqrt(.5), 0};
	EXPECT_THAT(quat, Pointwise(DoubleNear(tol), expected6));
	}

	using Mat2RotTest = MujocoTest;

	TEST_F(Mat2RotTest, RotationFromArbitraryMatrix) {
	// create arbitrary target rotation matrix
	mjtNum target[4], rot[9];
	mjtNum axis[3] = {1, 1, 1};
	mju_axisAngle2Quat(target, axis, mjPI/6);
	mju_normalize4(target);
	mju_quat2Mat(rot, target);

	// combine rotation with arbitrary stretch
	mjtNum mat[9];
	mjtNum deformation_gradient[9] = {0.5, 0.25, 0.125,
	0.3, 0.66, 0.999,
	0.4, 0.22, 0.111};
	mjtNum stretch[9];
	mju_mulMatTMat3(stretch, deformation_gradient, deformation_gradient);
	mju_mulMatMat3(mat, rot, stretch);

	// calculate rotational part of the matrix
	mjtNum quat[4] = {1, 0, 0, 0};
	int niter = mju_mat2Rot(quat, mat);
	EXPECT_THAT(quat, Pointwise(DoubleNear(1e-8), target));
	EXPECT_LE(niter, 150);
	}

	TEST_F(Mat2RotTest, IdentityFromRandomRotation) {
	// This test is based on the following paper:
	// Müller, Matthias, Jan Bender, Nuttapong Chentanez, and Miles Macklin. "A
	// robust method to extract the rotational part of deformations." In
	// Proceedings of the 9th International Conference on Motion in Games, pp.
	// 55-60. 2016.
	mjtNum mat[9] = {1, 0, 0, 0, 1, 0, 0, 0, 1};
	srand(123);

	for (int i = 0; i < 100; ++i) {
	// random quaternion
	mjtNum quat[4];
	for (int j = 0; j < 4; ++j) {
	quat[j] = rand() / (float)RAND_MAX; // NOLINT
	}

	// calculate rotational part of the matrix
	mjtNum res[9];
	mju_normalize4(quat);
	EXPECT_LE(mju_mat2Rot(quat, mat), 40);
	mju_quat2Mat(res, quat);
	EXPECT_THAT(res, Pointwise(DoubleNear(1e-6), mat));
	}
	}

	TEST_F(Mat2RotTest, SpecialCases) {
	mjtNum eye[9] = {1, 0, 0, 0, 1, 0, 0, 0, 1};
	mjtNum quat[4] = {1, 0, 0, 0};
	EXPECT_EQ(mju_mat2Rot(quat, eye), 0);
	EXPECT_THAT(quat, Pointwise(DoubleNear(1e-8), {1, 0, 0, 0}));
	mjtNum zero[9] = {0, 0, 0, 0, 0, 0, 0, 0, 0};
	EXPECT_EQ(mju_mat2Rot(quat, zero), 0);
	EXPECT_THAT(quat, Pointwise(DoubleNear(1e-8), {1, 0, 0, 0}));
	mjtNum ones[9] = {1, 1, 1, 1, 1, 1, 1, 1, 1};
	EXPECT_EQ(mju_mat2Rot(quat, ones), 0);
	EXPECT_THAT(quat, Pointwise(DoubleNear(1e-8), {1, 0, 0, 0}));
	}

	} // namespace
	} // namespace mujoco