source: pacpussensors/trunk/Vislab/lib3dv/eigen/unsupported/Eigen/src/NumericalDiff/NumericalDiff.h@ 136

Last change on this file since 136 was 136, checked in by ldecherf, 7 years ago

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1// -*- coding: utf-8
2// vim: set fileencoding=utf-8
3
4// This file is part of Eigen, a lightweight C++ template library
5// for linear algebra.
6//
7// Copyright (C) 2009 Thomas Capricelli <orzel@freehackers.org>
8//
9// This Source Code Form is subject to the terms of the Mozilla
10// Public License v. 2.0. If a copy of the MPL was not distributed
11// with this file, You can obtain one at http://mozilla.org/MPL/2.0/.
12
13#ifndef EIGEN_NUMERICAL_DIFF_H
14#define EIGEN_NUMERICAL_DIFF_H
15
16namespace Eigen {
17
18enum NumericalDiffMode {
19 Forward,
20 Central
21};
22
23
24/**
25 * This class allows you to add a method df() to your functor, which will
26 * use numerical differentiation to compute an approximate of the
27 * derivative for the functor. Of course, if you have an analytical form
28 * for the derivative, you should rather implement df() by yourself.
29 *
30 * More information on
31 * http://en.wikipedia.org/wiki/Numerical_differentiation
32 *
33 * Currently only "Forward" and "Central" scheme are implemented.
34 */
35template<typename _Functor, NumericalDiffMode mode=Forward>
36class NumericalDiff : public _Functor
37{
38public:
39 typedef _Functor Functor;
40 typedef typename Functor::Scalar Scalar;
41 typedef typename Functor::InputType InputType;
42 typedef typename Functor::ValueType ValueType;
43 typedef typename Functor::JacobianType JacobianType;
44
45 NumericalDiff(Scalar _epsfcn=0.) : Functor(), epsfcn(_epsfcn) {}
46 NumericalDiff(const Functor& f, Scalar _epsfcn=0.) : Functor(f), epsfcn(_epsfcn) {}
47
48 // forward constructors
49 template<typename T0>
50 NumericalDiff(const T0& a0) : Functor(a0), epsfcn(0) {}
51 template<typename T0, typename T1>
52 NumericalDiff(const T0& a0, const T1& a1) : Functor(a0, a1), epsfcn(0) {}
53 template<typename T0, typename T1, typename T2>
54 NumericalDiff(const T0& a0, const T1& a1, const T2& a2) : Functor(a0, a1, a2), epsfcn(0) {}
55
56 enum {
57 InputsAtCompileTime = Functor::InputsAtCompileTime,
58 ValuesAtCompileTime = Functor::ValuesAtCompileTime
59 };
60
61 /**
62 * return the number of evaluation of functor
63 */
64 int df(const InputType& _x, JacobianType &jac) const
65 {
66 using std::sqrt;
67 using std::abs;
68 /* Local variables */
69 Scalar h;
70 int nfev=0;
71 const typename InputType::Index n = _x.size();
72 const Scalar eps = sqrt(((std::max)(epsfcn,NumTraits<Scalar>::epsilon() )));
73 ValueType val1, val2;
74 InputType x = _x;
75 // TODO : we should do this only if the size is not already known
76 val1.resize(Functor::values());
77 val2.resize(Functor::values());
78
79 // initialization
80 switch(mode) {
81 case Forward:
82 // compute f(x)
83 Functor::operator()(x, val1); nfev++;
84 break;
85 case Central:
86 // do nothing
87 break;
88 default:
89 eigen_assert(false);
90 };
91
92 // Function Body
93 for (int j = 0; j < n; ++j) {
94 h = eps * abs(x[j]);
95 if (h == 0.) {
96 h = eps;
97 }
98 switch(mode) {
99 case Forward:
100 x[j] += h;
101 Functor::operator()(x, val2);
102 nfev++;
103 x[j] = _x[j];
104 jac.col(j) = (val2-val1)/h;
105 break;
106 case Central:
107 x[j] += h;
108 Functor::operator()(x, val2); nfev++;
109 x[j] -= 2*h;
110 Functor::operator()(x, val1); nfev++;
111 x[j] = _x[j];
112 jac.col(j) = (val2-val1)/(2*h);
113 break;
114 default:
115 eigen_assert(false);
116 };
117 }
118 return nfev;
119 }
120private:
121 Scalar epsfcn;
122
123 NumericalDiff& operator=(const NumericalDiff&);
124};
125
126} // end namespace Eigen
127
128//vim: ai ts=4 sts=4 et sw=4
129#endif // EIGEN_NUMERICAL_DIFF_H
130
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