You can not select more than 25 topics
Topics must start with a letter or number, can include dashes ('-') and can be up to 35 characters long.
387 lines
11 KiB
387 lines
11 KiB
// This file is part of Eigen, a lightweight C++ template library |
|
// for linear algebra. |
|
// |
|
// Copyright (C) 2009 Gael Guennebaud <g.gael@free.fr> |
|
// |
|
// 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 the mozilla.org home page |
|
|
|
#include "main.h" |
|
#include <unsupported/Eigen/AutoDiff> |
|
|
|
template<typename Scalar> |
|
EIGEN_DONT_INLINE Scalar foo(const Scalar& x, const Scalar& y) |
|
{ |
|
using namespace std; |
|
// return x+std::sin(y); |
|
EIGEN_ASM_COMMENT("mybegin"); |
|
// pow(float, int) promotes to pow(double, double) |
|
return x*2 - 1 + static_cast<Scalar>(pow(1+x,2)) + 2*sqrt(y*y+0) - 4 * sin(0+x) + 2 * cos(y+0) - exp(Scalar(-0.5)*x*x+0); |
|
//return x+2*y*x;//x*2 -std::pow(x,2);//(2*y/x);// - y*2; |
|
EIGEN_ASM_COMMENT("myend"); |
|
} |
|
|
|
template<typename Vector> |
|
EIGEN_DONT_INLINE typename Vector::Scalar foo(const Vector& p) |
|
{ |
|
typedef typename Vector::Scalar Scalar; |
|
return (p-Vector(Scalar(-1),Scalar(1.))).norm() + (p.array() * p.array()).sum() + p.dot(p); |
|
} |
|
|
|
template<typename _Scalar, int NX=Dynamic, int NY=Dynamic> |
|
struct TestFunc1 |
|
{ |
|
typedef _Scalar Scalar; |
|
enum { |
|
InputsAtCompileTime = NX, |
|
ValuesAtCompileTime = NY |
|
}; |
|
typedef Matrix<Scalar,InputsAtCompileTime,1> InputType; |
|
typedef Matrix<Scalar,ValuesAtCompileTime,1> ValueType; |
|
typedef Matrix<Scalar,ValuesAtCompileTime,InputsAtCompileTime> JacobianType; |
|
|
|
int m_inputs, m_values; |
|
|
|
TestFunc1() : m_inputs(InputsAtCompileTime), m_values(ValuesAtCompileTime) {} |
|
TestFunc1(int inputs_, int values_) : m_inputs(inputs_), m_values(values_) {} |
|
|
|
int inputs() const { return m_inputs; } |
|
int values() const { return m_values; } |
|
|
|
template<typename T> |
|
void operator() (const Matrix<T,InputsAtCompileTime,1>& x, Matrix<T,ValuesAtCompileTime,1>* _v) const |
|
{ |
|
Matrix<T,ValuesAtCompileTime,1>& v = *_v; |
|
|
|
v[0] = 2 * x[0] * x[0] + x[0] * x[1]; |
|
v[1] = 3 * x[1] * x[0] + 0.5 * x[1] * x[1]; |
|
if(inputs()>2) |
|
{ |
|
v[0] += 0.5 * x[2]; |
|
v[1] += x[2]; |
|
} |
|
if(values()>2) |
|
{ |
|
v[2] = 3 * x[1] * x[0] * x[0]; |
|
} |
|
if (inputs()>2 && values()>2) |
|
v[2] *= x[2]; |
|
} |
|
|
|
void operator() (const InputType& x, ValueType* v, JacobianType* _j) const |
|
{ |
|
(*this)(x, v); |
|
|
|
if(_j) |
|
{ |
|
JacobianType& j = *_j; |
|
|
|
j(0,0) = 4 * x[0] + x[1]; |
|
j(1,0) = 3 * x[1]; |
|
|
|
j(0,1) = x[0]; |
|
j(1,1) = 3 * x[0] + 2 * 0.5 * x[1]; |
|
|
|
if (inputs()>2) |
|
{ |
|
j(0,2) = 0.5; |
|
j(1,2) = 1; |
|
} |
|
if(values()>2) |
|
{ |
|
j(2,0) = 3 * x[1] * 2 * x[0]; |
|
j(2,1) = 3 * x[0] * x[0]; |
|
} |
|
if (inputs()>2 && values()>2) |
|
{ |
|
j(2,0) *= x[2]; |
|
j(2,1) *= x[2]; |
|
|
|
j(2,2) = 3 * x[1] * x[0] * x[0]; |
|
j(2,2) = 3 * x[1] * x[0] * x[0]; |
|
} |
|
} |
|
} |
|
}; |
|
|
|
|
|
#if EIGEN_HAS_VARIADIC_TEMPLATES |
|
/* Test functor for the C++11 features. */ |
|
template <typename Scalar> |
|
struct integratorFunctor |
|
{ |
|
typedef Matrix<Scalar, 2, 1> InputType; |
|
typedef Matrix<Scalar, 2, 1> ValueType; |
|
|
|
/* |
|
* Implementation starts here. |
|
*/ |
|
integratorFunctor(const Scalar gain) : _gain(gain) {} |
|
integratorFunctor(const integratorFunctor& f) : _gain(f._gain) {} |
|
const Scalar _gain; |
|
|
|
template <typename T1, typename T2> |
|
void operator() (const T1 &input, T2 *output, const Scalar dt) const |
|
{ |
|
T2 &o = *output; |
|
|
|
/* Integrator to test the AD. */ |
|
o[0] = input[0] + input[1] * dt * _gain; |
|
o[1] = input[1] * _gain; |
|
} |
|
|
|
/* Only needed for the test */ |
|
template <typename T1, typename T2, typename T3> |
|
void operator() (const T1 &input, T2 *output, T3 *jacobian, const Scalar dt) const |
|
{ |
|
T2 &o = *output; |
|
|
|
/* Integrator to test the AD. */ |
|
o[0] = input[0] + input[1] * dt * _gain; |
|
o[1] = input[1] * _gain; |
|
|
|
if (jacobian) |
|
{ |
|
T3 &j = *jacobian; |
|
|
|
j(0, 0) = 1; |
|
j(0, 1) = dt * _gain; |
|
j(1, 0) = 0; |
|
j(1, 1) = _gain; |
|
} |
|
} |
|
|
|
}; |
|
|
|
template<typename Func> void forward_jacobian_cpp11(const Func& f) |
|
{ |
|
typedef typename Func::ValueType::Scalar Scalar; |
|
typedef typename Func::ValueType ValueType; |
|
typedef typename Func::InputType InputType; |
|
typedef typename AutoDiffJacobian<Func>::JacobianType JacobianType; |
|
|
|
InputType x = InputType::Random(InputType::RowsAtCompileTime); |
|
ValueType y, yref; |
|
JacobianType j, jref; |
|
|
|
const Scalar dt = internal::random<double>(); |
|
|
|
jref.setZero(); |
|
yref.setZero(); |
|
f(x, &yref, &jref, dt); |
|
|
|
//std::cerr << "y, yref, jref: " << "\n"; |
|
//std::cerr << y.transpose() << "\n\n"; |
|
//std::cerr << yref << "\n\n"; |
|
//std::cerr << jref << "\n\n"; |
|
|
|
AutoDiffJacobian<Func> autoj(f); |
|
autoj(x, &y, &j, dt); |
|
|
|
//std::cerr << "y j (via autodiff): " << "\n"; |
|
//std::cerr << y.transpose() << "\n\n"; |
|
//std::cerr << j << "\n\n"; |
|
|
|
VERIFY_IS_APPROX(y, yref); |
|
VERIFY_IS_APPROX(j, jref); |
|
} |
|
#endif |
|
|
|
template<typename Func> void forward_jacobian(const Func& f) |
|
{ |
|
typename Func::InputType x = Func::InputType::Random(f.inputs()); |
|
typename Func::ValueType y(f.values()), yref(f.values()); |
|
typename Func::JacobianType j(f.values(),f.inputs()), jref(f.values(),f.inputs()); |
|
|
|
jref.setZero(); |
|
yref.setZero(); |
|
f(x,&yref,&jref); |
|
// std::cerr << y.transpose() << "\n\n";; |
|
// std::cerr << j << "\n\n";; |
|
|
|
j.setZero(); |
|
y.setZero(); |
|
AutoDiffJacobian<Func> autoj(f); |
|
autoj(x, &y, &j); |
|
// std::cerr << y.transpose() << "\n\n";; |
|
// std::cerr << j << "\n\n";; |
|
|
|
VERIFY_IS_APPROX(y, yref); |
|
VERIFY_IS_APPROX(j, jref); |
|
} |
|
|
|
// TODO also check actual derivatives! |
|
template <int> |
|
void test_autodiff_scalar() |
|
{ |
|
Vector2f p = Vector2f::Random(); |
|
typedef AutoDiffScalar<Vector2f> AD; |
|
AD ax(p.x(),Vector2f::UnitX()); |
|
AD ay(p.y(),Vector2f::UnitY()); |
|
AD res = foo<AD>(ax,ay); |
|
VERIFY_IS_APPROX(res.value(), foo(p.x(),p.y())); |
|
} |
|
|
|
|
|
// TODO also check actual derivatives! |
|
template <int> |
|
void test_autodiff_vector() |
|
{ |
|
Vector2f p = Vector2f::Random(); |
|
typedef AutoDiffScalar<Vector2f> AD; |
|
typedef Matrix<AD,2,1> VectorAD; |
|
VectorAD ap = p.cast<AD>(); |
|
ap.x().derivatives() = Vector2f::UnitX(); |
|
ap.y().derivatives() = Vector2f::UnitY(); |
|
|
|
AD res = foo<VectorAD>(ap); |
|
VERIFY_IS_APPROX(res.value(), foo(p)); |
|
} |
|
|
|
template <int> |
|
void test_autodiff_jacobian() |
|
{ |
|
CALL_SUBTEST(( forward_jacobian(TestFunc1<double,2,2>()) )); |
|
CALL_SUBTEST(( forward_jacobian(TestFunc1<double,2,3>()) )); |
|
CALL_SUBTEST(( forward_jacobian(TestFunc1<double,3,2>()) )); |
|
CALL_SUBTEST(( forward_jacobian(TestFunc1<double,3,3>()) )); |
|
CALL_SUBTEST(( forward_jacobian(TestFunc1<double>(3,3)) )); |
|
#if EIGEN_HAS_VARIADIC_TEMPLATES |
|
CALL_SUBTEST(( forward_jacobian_cpp11(integratorFunctor<double>(10)) )); |
|
#endif |
|
} |
|
|
|
|
|
template <int> |
|
void test_autodiff_hessian() |
|
{ |
|
typedef AutoDiffScalar<VectorXd> AD; |
|
typedef Matrix<AD,Eigen::Dynamic,1> VectorAD; |
|
typedef AutoDiffScalar<VectorAD> ADD; |
|
typedef Matrix<ADD,Eigen::Dynamic,1> VectorADD; |
|
VectorADD x(2); |
|
double s1 = internal::random<double>(), s2 = internal::random<double>(), s3 = internal::random<double>(), s4 = internal::random<double>(); |
|
x(0).value()=s1; |
|
x(1).value()=s2; |
|
|
|
//set unit vectors for the derivative directions (partial derivatives of the input vector) |
|
x(0).derivatives().resize(2); |
|
x(0).derivatives().setZero(); |
|
x(0).derivatives()(0)= 1; |
|
x(1).derivatives().resize(2); |
|
x(1).derivatives().setZero(); |
|
x(1).derivatives()(1)=1; |
|
|
|
//repeat partial derivatives for the inner AutoDiffScalar |
|
x(0).value().derivatives() = VectorXd::Unit(2,0); |
|
x(1).value().derivatives() = VectorXd::Unit(2,1); |
|
|
|
//set the hessian matrix to zero |
|
for(int idx=0; idx<2; idx++) { |
|
x(0).derivatives()(idx).derivatives() = VectorXd::Zero(2); |
|
x(1).derivatives()(idx).derivatives() = VectorXd::Zero(2); |
|
} |
|
|
|
ADD y = sin(AD(s3)*x(0) + AD(s4)*x(1)); |
|
|
|
VERIFY_IS_APPROX(y.value().derivatives()(0), y.derivatives()(0).value()); |
|
VERIFY_IS_APPROX(y.value().derivatives()(1), y.derivatives()(1).value()); |
|
VERIFY_IS_APPROX(y.value().derivatives()(0), s3*std::cos(s1*s3+s2*s4)); |
|
VERIFY_IS_APPROX(y.value().derivatives()(1), s4*std::cos(s1*s3+s2*s4)); |
|
VERIFY_IS_APPROX(y.derivatives()(0).derivatives(), -std::sin(s1*s3+s2*s4)*Vector2d(s3*s3,s4*s3)); |
|
VERIFY_IS_APPROX(y.derivatives()(1).derivatives(), -std::sin(s1*s3+s2*s4)*Vector2d(s3*s4,s4*s4)); |
|
|
|
ADD z = x(0)*x(1); |
|
VERIFY_IS_APPROX(z.derivatives()(0).derivatives(), Vector2d(0,1)); |
|
VERIFY_IS_APPROX(z.derivatives()(1).derivatives(), Vector2d(1,0)); |
|
} |
|
|
|
double bug_1222() { |
|
typedef Eigen::AutoDiffScalar<Eigen::Vector3d> AD; |
|
const double _cv1_3 = 1.0; |
|
const AD chi_3 = 1.0; |
|
// this line did not work, because operator+ returns ADS<DerType&>, which then cannot be converted to ADS<DerType> |
|
const AD denom = chi_3 + _cv1_3; |
|
return denom.value(); |
|
} |
|
|
|
#ifdef EIGEN_TEST_PART_5 |
|
|
|
double bug_1223() { |
|
using std::min; |
|
typedef Eigen::AutoDiffScalar<Eigen::Vector3d> AD; |
|
|
|
const double _cv1_3 = 1.0; |
|
const AD chi_3 = 1.0; |
|
const AD denom = 1.0; |
|
|
|
// failed because implementation of min attempts to construct ADS<DerType&> via constructor AutoDiffScalar(const Real& value) |
|
// without initializing m_derivatives (which is a reference in this case) |
|
#define EIGEN_TEST_SPACE |
|
const AD t = min EIGEN_TEST_SPACE (denom / chi_3, 1.0); |
|
|
|
const AD t2 = min EIGEN_TEST_SPACE (denom / (chi_3 * _cv1_3), 1.0); |
|
|
|
return t.value() + t2.value(); |
|
} |
|
|
|
// regression test for some compilation issues with specializations of ScalarBinaryOpTraits |
|
void bug_1260() { |
|
Matrix4d A = Matrix4d::Ones(); |
|
Vector4d v = Vector4d::Ones(); |
|
A*v; |
|
} |
|
|
|
// check a compilation issue with numext::max |
|
double bug_1261() { |
|
typedef AutoDiffScalar<Matrix2d> AD; |
|
typedef Matrix<AD,2,1> VectorAD; |
|
|
|
VectorAD v(0.,0.); |
|
const AD maxVal = v.maxCoeff(); |
|
const AD minVal = v.minCoeff(); |
|
return maxVal.value() + minVal.value(); |
|
} |
|
|
|
double bug_1264() { |
|
typedef AutoDiffScalar<Vector2d> AD; |
|
const AD s = 0.; |
|
const Matrix<AD, 3, 1> v1(0.,0.,0.); |
|
const Matrix<AD, 3, 1> v2 = (s + 3.0) * v1; |
|
return v2(0).value(); |
|
} |
|
|
|
// check with expressions on constants |
|
double bug_1281() { |
|
int n = 2; |
|
typedef AutoDiffScalar<VectorXd> AD; |
|
const AD c = 1.; |
|
AD x0(2,n,0); |
|
AD y1 = (AD(c)+AD(c))*x0; |
|
y1 = x0 * (AD(c)+AD(c)); |
|
AD y2 = (-AD(c))+x0; |
|
y2 = x0+(-AD(c)); |
|
AD y3 = (AD(c)*(-AD(c))+AD(c))*x0; |
|
y3 = x0 * (AD(c)*(-AD(c))+AD(c)); |
|
return (y1+y2+y3).value(); |
|
} |
|
|
|
#endif |
|
|
|
EIGEN_DECLARE_TEST(autodiff) |
|
{ |
|
for(int i = 0; i < g_repeat; i++) { |
|
CALL_SUBTEST_1( test_autodiff_scalar<1>() ); |
|
CALL_SUBTEST_2( test_autodiff_vector<1>() ); |
|
CALL_SUBTEST_3( test_autodiff_jacobian<1>() ); |
|
CALL_SUBTEST_4( test_autodiff_hessian<1>() ); |
|
} |
|
|
|
CALL_SUBTEST_5( bug_1222() ); |
|
CALL_SUBTEST_5( bug_1223() ); |
|
CALL_SUBTEST_5( bug_1260() ); |
|
CALL_SUBTEST_5( bug_1261() ); |
|
CALL_SUBTEST_5( bug_1281() ); |
|
} |
|
|
|
|