unsupported/test/NumericalDiff.cpp - eigen - Git at Google

 // This file is part of Eigen, a lightweight C++ template library
 // for linear algebra.
 //
 // Copyright (C) 2009 Thomas Capricelli <orzel@freehackers.org>

 #include <stdio.h>

 #include "main.h"
 #include <unsupported/Eigen/NumericalDiff>

 // Generic functor
 template <typename Scalar_, int NX = Dynamic, int NY = Dynamic>
 struct Functor {
   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;

   Functor() : m_inputs(InputsAtCompileTime), m_values(ValuesAtCompileTime) {}
   Functor(int inputs_, int values_) : m_inputs(inputs_), m_values(values_) {}

   int inputs() const { return m_inputs; }
   int values() const { return m_values; }
 };

 struct my_functor : Functor<double> {
   my_functor(void) : Functor<double>(3, 15) {}
   int operator()(const VectorXd &x, VectorXd &fvec) const {
     double tmp1, tmp2, tmp3;
     double y[15] = {1.4e-1, 1.8e-1, 2.2e-1, 2.5e-1, 2.9e-1, 3.2e-1, 3.5e-1, 3.9e-1,
                     3.7e-1, 5.8e-1, 7.3e-1, 9.6e-1, 1.34,   2.1,    4.39};

     for (int i = 0; i < values(); i++) {
       tmp1 = i + 1;
       tmp2 = 16 - i - 1;
       tmp3 = (i >= 8) ? tmp2 : tmp1;
       fvec[i] = y[i] - (x[0] + tmp1 / (x[1] * tmp2 + x[2] * tmp3));
     }
     return 0;
   }

   int actual_df(const VectorXd &x, MatrixXd &fjac) const {
     double tmp1, tmp2, tmp3, tmp4;
     for (int i = 0; i < values(); i++) {
       tmp1 = i + 1;
       tmp2 = 16 - i - 1;
       tmp3 = (i >= 8) ? tmp2 : tmp1;
       tmp4 = (x[1] * tmp2 + x[2] * tmp3);
       tmp4 = tmp4 * tmp4;
       fjac(i, 0) = -1;
       fjac(i, 1) = tmp1 * tmp2 / tmp4;
       fjac(i, 2) = tmp1 * tmp3 / tmp4;
     }
     return 0;
   }
 };

 void test_forward() {
   VectorXd x(3);
   MatrixXd jac(15, 3);
   MatrixXd actual_jac(15, 3);
   my_functor functor;

   x << 0.082, 1.13, 2.35;

   // real one
   functor.actual_df(x, actual_jac);
   //    std::cout << actual_jac << std::endl << std::endl;

   // using NumericalDiff
   NumericalDiff<my_functor> numDiff(functor);
   numDiff.df(x, jac);
   //    std::cout << jac << std::endl;

   VERIFY_IS_APPROX(jac, actual_jac);
 }

 void test_central() {
   VectorXd x(3);
   MatrixXd jac(15, 3);
   MatrixXd actual_jac(15, 3);
   my_functor functor;

   x << 0.082, 1.13, 2.35;

   // real one
   functor.actual_df(x, actual_jac);

   // using NumericalDiff
   NumericalDiff<my_functor, Central> numDiff(functor);
   numDiff.df(x, jac);

   VERIFY_IS_APPROX(jac, actual_jac);
 }

 EIGEN_DECLARE_TEST(NumericalDiff) {
   CALL_SUBTEST(test_forward());
   CALL_SUBTEST(test_central());
 }
	// This file is part of Eigen, a lightweight C++ template library
	// for linear algebra.
	//
	// Copyright (C) 2009 Thomas Capricelli <orzel@freehackers.org>

	#include <stdio.h>

	#include "main.h"
	#include <unsupported/Eigen/NumericalDiff>

	// Generic functor
	template <typename Scalar_, int NX = Dynamic, int NY = Dynamic>
	struct Functor {
	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;

	Functor() : m_inputs(InputsAtCompileTime), m_values(ValuesAtCompileTime) {}
	Functor(int inputs_, int values_) : m_inputs(inputs_), m_values(values_) {}

	int inputs() const { return m_inputs; }
	int values() const { return m_values; }
	};

	struct my_functor : Functor<double> {
	my_functor(void) : Functor<double>(3, 15) {}
	int operator()(const VectorXd &x, VectorXd &fvec) const {
	double tmp1, tmp2, tmp3;
	double y[15] = {1.4e-1, 1.8e-1, 2.2e-1, 2.5e-1, 2.9e-1, 3.2e-1, 3.5e-1, 3.9e-1,
	3.7e-1, 5.8e-1, 7.3e-1, 9.6e-1, 1.34, 2.1, 4.39};

	for (int i = 0; i < values(); i++) {
	tmp1 = i + 1;
	tmp2 = 16 - i - 1;
	tmp3 = (i >= 8) ? tmp2 : tmp1;
	fvec[i] = y[i] - (x[0] + tmp1 / (x[1] * tmp2 + x[2] * tmp3));
	}
	return 0;
	}

	int actual_df(const VectorXd &x, MatrixXd &fjac) const {
	double tmp1, tmp2, tmp3, tmp4;
	for (int i = 0; i < values(); i++) {
	tmp1 = i + 1;
	tmp2 = 16 - i - 1;
	tmp3 = (i >= 8) ? tmp2 : tmp1;
	tmp4 = (x[1] * tmp2 + x[2] * tmp3);
	tmp4 = tmp4 * tmp4;
	fjac(i, 0) = -1;
	fjac(i, 1) = tmp1 * tmp2 / tmp4;
	fjac(i, 2) = tmp1 * tmp3 / tmp4;
	}
	return 0;
	}
	};

	void test_forward() {
	VectorXd x(3);
	MatrixXd jac(15, 3);
	MatrixXd actual_jac(15, 3);
	my_functor functor;

	x << 0.082, 1.13, 2.35;

	// real one
	functor.actual_df(x, actual_jac);
	// std::cout << actual_jac << std::endl << std::endl;

	// using NumericalDiff
	NumericalDiff<my_functor> numDiff(functor);
	numDiff.df(x, jac);
	// std::cout << jac << std::endl;

	VERIFY_IS_APPROX(jac, actual_jac);
	}

	void test_central() {
	VectorXd x(3);
	MatrixXd jac(15, 3);
	MatrixXd actual_jac(15, 3);
	my_functor functor;

	x << 0.082, 1.13, 2.35;

	// real one
	functor.actual_df(x, actual_jac);

	// using NumericalDiff
	NumericalDiff<my_functor, Central> numDiff(functor);
	numDiff.df(x, jac);

	VERIFY_IS_APPROX(jac, actual_jac);
	}

	EIGEN_DECLARE_TEST(NumericalDiff) {
	CALL_SUBTEST(test_forward());
	CALL_SUBTEST(test_central());
	}