test/denseLM.cpp - eigen - Git at Google

 // This file is part of Eigen, a lightweight C++ template library
 // for linear algebra.
 //
 // Copyright (C) 2012 Desire Nuentsa <desire.nuentsa_wakam@inria.fr>
 // Copyright (C) 2012 Gael Guennebaud <gael.guennebaud@inria.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 http://mozilla.org/MPL/2.0/.

 #include <iostream>
 #include <fstream>
 #include <iomanip>

 #include "main.h"
 #include <Eigen/LevenbergMarquardt>
 using namespace std;
 using namespace Eigen;

 template <typename Scalar>
 struct DenseLM : DenseFunctor<Scalar> {
   typedef DenseFunctor<Scalar> Base;
   typedef typename Base::JacobianType JacobianType;
   typedef Matrix<Scalar, Dynamic, 1> VectorType;

   DenseLM(int n, int m) : DenseFunctor<Scalar>(n, m) {}

   VectorType model(const VectorType& uv, VectorType& x) {
     VectorType y;  // Should change to use expression template
     int m = Base::values();
     int n = Base::inputs();
     eigen_assert(uv.size() % 2 == 0);
     eigen_assert(uv.size() == n);
     eigen_assert(x.size() == m);
     y.setZero(m);
     int half = n / 2;
     VectorBlock<const VectorType> u(uv, 0, half);
     VectorBlock<const VectorType> v(uv, half, half);
     for (int j = 0; j < m; j++) {
       for (int i = 0; i < half; i++) y(j) += u(i) * std::exp(-(x(j) - i) * (x(j) - i) / (v(i) * v(i)));
     }
     return y;
   }
   void initPoints(VectorType& uv_ref, VectorType& x) {
     m_x = x;
     m_y = this->model(uv_ref, x);
   }

   int operator()(const VectorType& uv, VectorType& fvec) {
     int m = Base::values();
     int n = Base::inputs();
     eigen_assert(uv.size() % 2 == 0);
     eigen_assert(uv.size() == n);
     eigen_assert(fvec.size() == m);
     int half = n / 2;
     VectorBlock<const VectorType> u(uv, 0, half);
     VectorBlock<const VectorType> v(uv, half, half);
     for (int j = 0; j < m; j++) {
       fvec(j) = m_y(j);
       for (int i = 0; i < half; i++) {
         fvec(j) -= u(i) * std::exp(-(m_x(j) - i) * (m_x(j) - i) / (v(i) * v(i)));
       }
     }

     return 0;
   }
   int df(const VectorType& uv, JacobianType& fjac) {
     int m = Base::values();
     int n = Base::inputs();
     eigen_assert(n == uv.size());
     eigen_assert(fjac.rows() == m);
     eigen_assert(fjac.cols() == n);
     int half = n / 2;
     VectorBlock<const VectorType> u(uv, 0, half);
     VectorBlock<const VectorType> v(uv, half, half);
     for (int j = 0; j < m; j++) {
       for (int i = 0; i < half; i++) {
         fjac.coeffRef(j, i) = -std::exp(-(m_x(j) - i) * (m_x(j) - i) / (v(i) * v(i)));
         fjac.coeffRef(j, i + half) = -2. * u(i) * (m_x(j) - i) * (m_x(j) - i) / (std::pow(v(i), 3)) *
                                      std::exp(-(m_x(j) - i) * (m_x(j) - i) / (v(i) * v(i)));
       }
     }
     return 0;
   }
   VectorType m_x, m_y;  // Data Points
 };

 template <typename FunctorType, typename VectorType>
 int test_minimizeLM(FunctorType& functor, VectorType& uv) {
   LevenbergMarquardt<FunctorType> lm(functor);
   LevenbergMarquardtSpace::Status info;

   info = lm.minimize(uv);

   VERIFY_IS_EQUAL(info, 1);
   // FIXME Check other parameters
   return info;
 }

 template <typename FunctorType, typename VectorType>
 int test_lmder(FunctorType& functor, VectorType& uv) {
   typedef typename VectorType::Scalar Scalar;
   LevenbergMarquardtSpace::Status info;
   LevenbergMarquardt<FunctorType> lm(functor);
   info = lm.lmder1(uv);

   VERIFY_IS_EQUAL(info, 1);
   // FIXME Check other parameters
   return info;
 }

 template <typename FunctorType, typename VectorType>
 int test_minimizeSteps(FunctorType& functor, VectorType& uv) {
   LevenbergMarquardtSpace::Status info;
   LevenbergMarquardt<FunctorType> lm(functor);
   info = lm.minimizeInit(uv);
   if (info == LevenbergMarquardtSpace::ImproperInputParameters) return info;
   do {
     info = lm.minimizeOneStep(uv);
   } while (info == LevenbergMarquardtSpace::Running);

   VERIFY_IS_EQUAL(info, 1);
   // FIXME Check other parameters
   return info;
 }

 template <typename T>
 void test_denseLM_T() {
   typedef Matrix<T, Dynamic, 1> VectorType;

   int inputs = 10;
   int values = 1000;
   DenseLM<T> dense_gaussian(inputs, values);
   VectorType uv(inputs), uv_ref(inputs);
   VectorType x(values);

   // Generate the reference solution
   uv_ref << -2, 1, 4, 8, 6, 1.8, 1.2, 1.1, 1.9, 3;

   // Generate the reference data points
   x.setRandom();
   x = 10 * x;
   x.array() += 10;
   dense_gaussian.initPoints(uv_ref, x);

   // Generate the initial parameters
   VectorBlock<VectorType> u(uv, 0, inputs / 2);
   VectorBlock<VectorType> v(uv, inputs / 2, inputs / 2);

   // Solve the optimization problem

   // Solve in one go
   u.setOnes();
   v.setOnes();
   test_minimizeLM(dense_gaussian, uv);

   // Solve until the machine precision
   u.setOnes();
   v.setOnes();
   test_lmder(dense_gaussian, uv);

   // Solve step by step
   v.setOnes();
   u.setOnes();
   test_minimizeSteps(dense_gaussian, uv);
 }

 EIGEN_DECLARE_TEST(denseLM) {
   CALL_SUBTEST_2(test_denseLM_T<double>());

   // CALL_SUBTEST_2(test_sparseLM_T<std::complex<double>());
 }
	// This file is part of Eigen, a lightweight C++ template library
	// for linear algebra.
	//
	// Copyright (C) 2012 Desire Nuentsa <desire.nuentsa_wakam@inria.fr>
	// Copyright (C) 2012 Gael Guennebaud <gael.guennebaud@inria.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 http://mozilla.org/MPL/2.0/.

	#include <iostream>
	#include <fstream>
	#include <iomanip>

	#include "main.h"
	#include <Eigen/LevenbergMarquardt>
	using namespace std;
	using namespace Eigen;

	template <typename Scalar>
	struct DenseLM : DenseFunctor<Scalar> {
	typedef DenseFunctor<Scalar> Base;
	typedef typename Base::JacobianType JacobianType;
	typedef Matrix<Scalar, Dynamic, 1> VectorType;

	DenseLM(int n, int m) : DenseFunctor<Scalar>(n, m) {}

	VectorType model(const VectorType& uv, VectorType& x) {
	VectorType y; // Should change to use expression template
	int m = Base::values();
	int n = Base::inputs();
	eigen_assert(uv.size() % 2 == 0);
	eigen_assert(uv.size() == n);
	eigen_assert(x.size() == m);
	y.setZero(m);
	int half = n / 2;
	VectorBlock<const VectorType> u(uv, 0, half);
	VectorBlock<const VectorType> v(uv, half, half);
	for (int j = 0; j < m; j++) {
	for (int i = 0; i < half; i++) y(j) += u(i) * std::exp(-(x(j) - i) * (x(j) - i) / (v(i) * v(i)));
	}
	return y;
	}
	void initPoints(VectorType& uv_ref, VectorType& x) {
	m_x = x;
	m_y = this->model(uv_ref, x);
	}

	int operator()(const VectorType& uv, VectorType& fvec) {
	int m = Base::values();
	int n = Base::inputs();
	eigen_assert(uv.size() % 2 == 0);
	eigen_assert(uv.size() == n);
	eigen_assert(fvec.size() == m);
	int half = n / 2;
	VectorBlock<const VectorType> u(uv, 0, half);
	VectorBlock<const VectorType> v(uv, half, half);
	for (int j = 0; j < m; j++) {
	fvec(j) = m_y(j);
	for (int i = 0; i < half; i++) {
	fvec(j) -= u(i) * std::exp(-(m_x(j) - i) * (m_x(j) - i) / (v(i) * v(i)));
	}
	}

	return 0;
	}
	int df(const VectorType& uv, JacobianType& fjac) {
	int m = Base::values();
	int n = Base::inputs();
	eigen_assert(n == uv.size());
	eigen_assert(fjac.rows() == m);
	eigen_assert(fjac.cols() == n);
	int half = n / 2;
	VectorBlock<const VectorType> u(uv, 0, half);
	VectorBlock<const VectorType> v(uv, half, half);
	for (int j = 0; j < m; j++) {
	for (int i = 0; i < half; i++) {
	fjac.coeffRef(j, i) = -std::exp(-(m_x(j) - i) * (m_x(j) - i) / (v(i) * v(i)));
	fjac.coeffRef(j, i + half) = -2. * u(i) * (m_x(j) - i) * (m_x(j) - i) / (std::pow(v(i), 3)) *
	std::exp(-(m_x(j) - i) * (m_x(j) - i) / (v(i) * v(i)));
	}
	}
	return 0;
	}
	VectorType m_x, m_y; // Data Points
	};

	template <typename FunctorType, typename VectorType>
	int test_minimizeLM(FunctorType& functor, VectorType& uv) {
	LevenbergMarquardt<FunctorType> lm(functor);
	LevenbergMarquardtSpace::Status info;

	info = lm.minimize(uv);

	VERIFY_IS_EQUAL(info, 1);
	// FIXME Check other parameters
	return info;
	}

	template <typename FunctorType, typename VectorType>
	int test_lmder(FunctorType& functor, VectorType& uv) {
	typedef typename VectorType::Scalar Scalar;
	LevenbergMarquardtSpace::Status info;
	LevenbergMarquardt<FunctorType> lm(functor);
	info = lm.lmder1(uv);

	VERIFY_IS_EQUAL(info, 1);
	// FIXME Check other parameters
	return info;
	}

	template <typename FunctorType, typename VectorType>
	int test_minimizeSteps(FunctorType& functor, VectorType& uv) {
	LevenbergMarquardtSpace::Status info;
	LevenbergMarquardt<FunctorType> lm(functor);
	info = lm.minimizeInit(uv);
	if (info == LevenbergMarquardtSpace::ImproperInputParameters) return info;
	do {
	info = lm.minimizeOneStep(uv);
	} while (info == LevenbergMarquardtSpace::Running);

	VERIFY_IS_EQUAL(info, 1);
	// FIXME Check other parameters
	return info;
	}

	template <typename T>
	void test_denseLM_T() {
	typedef Matrix<T, Dynamic, 1> VectorType;

	int inputs = 10;
	int values = 1000;
	DenseLM<T> dense_gaussian(inputs, values);
	VectorType uv(inputs), uv_ref(inputs);
	VectorType x(values);

	// Generate the reference solution
	uv_ref << -2, 1, 4, 8, 6, 1.8, 1.2, 1.1, 1.9, 3;

	// Generate the reference data points
	x.setRandom();
	x = 10 * x;
	x.array() += 10;
	dense_gaussian.initPoints(uv_ref, x);

	// Generate the initial parameters
	VectorBlock<VectorType> u(uv, 0, inputs / 2);
	VectorBlock<VectorType> v(uv, inputs / 2, inputs / 2);

	// Solve the optimization problem

	// Solve in one go
	u.setOnes();
	v.setOnes();
	test_minimizeLM(dense_gaussian, uv);

	// Solve until the machine precision
	u.setOnes();
	v.setOnes();
	test_lmder(dense_gaussian, uv);

	// Solve step by step
	v.setOnes();
	u.setOnes();
	test_minimizeSteps(dense_gaussian, uv);
	}

	EIGEN_DECLARE_TEST(denseLM) {
	CALL_SUBTEST_2(test_denseLM_T<double>());

	// CALL_SUBTEST_2(test_sparseLM_T<std::complex<double>());
	}