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303 lines
16 KiB
303 lines
16 KiB
9 years ago
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/*M///////////////////////////////////////////////////////////////////////////////////////
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//
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// IMPORTANT: READ BEFORE DOWNLOADING, COPYING, INSTALLING OR USING.
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//
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// By downloading, copying, installing or using the software you agree to this license.
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// If you do not agree to this license, do not download, install,
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// copy or use the software.
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//
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//
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// License Agreement
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// For Open Source Computer Vision Library
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//
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// Copyright (C) 2013, OpenCV Foundation, all rights reserved.
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// Third party copyrights are property of their respective owners.
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//
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// Redistribution and use in source and binary forms, with or without modification,
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// are permitted provided that the following conditions are met:
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//
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// * Redistribution's of source code must retain the above copyright notice,
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// this list of conditions and the following disclaimer.
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//
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// * Redistribution's in binary form must reproduce the above copyright notice,
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// this list of conditions and the following disclaimer in the documentation
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// and/or other materials provided with the distribution.
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//
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// * The name of the copyright holders may not be used to endorse or promote products
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// derived from this software without specific prior written permission.
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//
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// This software is provided by the copyright holders and contributors "as is" and
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// any express or implied warranties, including, but not limited to, the implied
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// warranties of merchantability and fitness for a particular purpose are disclaimed.
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// In no event shall the OpenCV Foundation or contributors be liable for any direct,
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// indirect, incidental, special, exemplary, or consequential damages
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// (including, but not limited to, procurement of substitute goods or services;
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// loss of use, data, or profits; or business interruption) however caused
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// and on any theory of liability, whether in contract, strict liability,
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// or tort (including negligence or otherwise) arising in any way out of
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// the use of this software, even if advised of the possibility of such damage.
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//
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//M*/
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#ifndef __OPENCV_OPTIM_HPP__
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#define __OPENCV_OPTIM_HPP__
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#include "opencv2/core.hpp"
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namespace cv
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{
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/** @addtogroup core_optim
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The algorithms in this section minimize or maximize function value within specified constraints or
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without any constraints.
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@{
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*/
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/** @brief Basic interface for all solvers
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*/
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class CV_EXPORTS MinProblemSolver : public Algorithm
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{
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public:
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/** @brief Represents function being optimized
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*/
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class CV_EXPORTS Function
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{
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public:
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virtual ~Function() {}
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virtual int getDims() const = 0;
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virtual double getGradientEps() const;
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virtual double calc(const double* x) const = 0;
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virtual void getGradient(const double* x,double* grad);
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};
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/** @brief Getter for the optimized function.
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The optimized function is represented by Function interface, which requires derivatives to
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implement the sole method calc(double*) to evaluate the function.
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@return Smart-pointer to an object that implements Function interface - it represents the
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function that is being optimized. It can be empty, if no function was given so far.
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*/
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virtual Ptr<Function> getFunction() const = 0;
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/** @brief Setter for the optimized function.
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*It should be called at least once before the call to* minimize(), as default value is not usable.
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@param f The new function to optimize.
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*/
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virtual void setFunction(const Ptr<Function>& f) = 0;
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/** @brief Getter for the previously set terminal criteria for this algorithm.
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@return Deep copy of the terminal criteria used at the moment.
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*/
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virtual TermCriteria getTermCriteria() const = 0;
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/** @brief Set terminal criteria for solver.
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This method *is not necessary* to be called before the first call to minimize(), as the default
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value is sensible.
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Algorithm stops when the number of function evaluations done exceeds termcrit.maxCount, when
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the function values at the vertices of simplex are within termcrit.epsilon range or simplex
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becomes so small that it can enclosed in a box with termcrit.epsilon sides, whatever comes
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first.
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@param termcrit Terminal criteria to be used, represented as cv::TermCriteria structure.
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*/
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virtual void setTermCriteria(const TermCriteria& termcrit) = 0;
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/** @brief actually runs the algorithm and performs the minimization.
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The sole input parameter determines the centroid of the starting simplex (roughly, it tells
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where to start), all the others (terminal criteria, initial step, function to be minimized) are
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supposed to be set via the setters before the call to this method or the default values (not
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always sensible) will be used.
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@param x The initial point, that will become a centroid of an initial simplex. After the algorithm
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will terminate, it will be setted to the point where the algorithm stops, the point of possible
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minimum.
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@return The value of a function at the point found.
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*/
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virtual double minimize(InputOutputArray x) = 0;
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};
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/** @brief This class is used to perform the non-linear non-constrained minimization of a function,
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defined on an `n`-dimensional Euclidean space, using the **Nelder-Mead method**, also known as
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**downhill simplex method**. The basic idea about the method can be obtained from
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<http://en.wikipedia.org/wiki/Nelder-Mead_method>.
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It should be noted, that this method, although deterministic, is rather a heuristic and therefore
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may converge to a local minima, not necessary a global one. It is iterative optimization technique,
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which at each step uses an information about the values of a function evaluated only at `n+1`
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points, arranged as a *simplex* in `n`-dimensional space (hence the second name of the method). At
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each step new point is chosen to evaluate function at, obtained value is compared with previous
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ones and based on this information simplex changes it's shape , slowly moving to the local minimum.
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Thus this method is using *only* function values to make decision, on contrary to, say, Nonlinear
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Conjugate Gradient method (which is also implemented in optim).
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Algorithm stops when the number of function evaluations done exceeds termcrit.maxCount, when the
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function values at the vertices of simplex are within termcrit.epsilon range or simplex becomes so
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small that it can enclosed in a box with termcrit.epsilon sides, whatever comes first, for some
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defined by user positive integer termcrit.maxCount and positive non-integer termcrit.epsilon.
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@note DownhillSolver is a derivative of the abstract interface
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cv::MinProblemSolver, which in turn is derived from the Algorithm interface and is used to
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encapsulate the functionality, common to all non-linear optimization algorithms in the optim
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module.
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@note term criteria should meet following condition:
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@code
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termcrit.type == (TermCriteria::MAX_ITER + TermCriteria::EPS) && termcrit.epsilon > 0 && termcrit.maxCount > 0
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@endcode
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*/
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class CV_EXPORTS DownhillSolver : public MinProblemSolver
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{
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public:
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/** @brief Returns the initial step that will be used in downhill simplex algorithm.
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@param step Initial step that will be used in algorithm. Note, that although corresponding setter
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accepts column-vectors as well as row-vectors, this method will return a row-vector.
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@see DownhillSolver::setInitStep
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*/
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virtual void getInitStep(OutputArray step) const=0;
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/** @brief Sets the initial step that will be used in downhill simplex algorithm.
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Step, together with initial point (givin in DownhillSolver::minimize) are two `n`-dimensional
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vectors that are used to determine the shape of initial simplex. Roughly said, initial point
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determines the position of a simplex (it will become simplex's centroid), while step determines the
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spread (size in each dimension) of a simplex. To be more precise, if \f$s,x_0\in\mathbb{R}^n\f$ are
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the initial step and initial point respectively, the vertices of a simplex will be:
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\f$v_0:=x_0-\frac{1}{2} s\f$ and \f$v_i:=x_0+s_i\f$ for \f$i=1,2,\dots,n\f$ where \f$s_i\f$ denotes
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projections of the initial step of *n*-th coordinate (the result of projection is treated to be
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vector given by \f$s_i:=e_i\cdot\left<e_i\cdot s\right>\f$, where \f$e_i\f$ form canonical basis)
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@param step Initial step that will be used in algorithm. Roughly said, it determines the spread
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(size in each dimension) of an initial simplex.
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*/
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virtual void setInitStep(InputArray step)=0;
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/** @brief This function returns the reference to the ready-to-use DownhillSolver object.
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All the parameters are optional, so this procedure can be called even without parameters at
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all. In this case, the default values will be used. As default value for terminal criteria are
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the only sensible ones, MinProblemSolver::setFunction() and DownhillSolver::setInitStep()
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should be called upon the obtained object, if the respective parameters were not given to
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create(). Otherwise, the two ways (give parameters to createDownhillSolver() or miss them out
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and call the MinProblemSolver::setFunction() and DownhillSolver::setInitStep()) are absolutely
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equivalent (and will drop the same errors in the same way, should invalid input be detected).
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@param f Pointer to the function that will be minimized, similarly to the one you submit via
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MinProblemSolver::setFunction.
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@param initStep Initial step, that will be used to construct the initial simplex, similarly to the one
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you submit via MinProblemSolver::setInitStep.
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@param termcrit Terminal criteria to the algorithm, similarly to the one you submit via
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MinProblemSolver::setTermCriteria.
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*/
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static Ptr<DownhillSolver> create(const Ptr<MinProblemSolver::Function>& f=Ptr<MinProblemSolver::Function>(),
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InputArray initStep=Mat_<double>(1,1,0.0),
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TermCriteria termcrit=TermCriteria(TermCriteria::MAX_ITER+TermCriteria::EPS,5000,0.000001));
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};
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/** @brief This class is used to perform the non-linear non-constrained minimization of a function
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with known gradient,
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defined on an *n*-dimensional Euclidean space, using the **Nonlinear Conjugate Gradient method**.
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The implementation was done based on the beautifully clear explanatory article [An Introduction to
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the Conjugate Gradient Method Without the Agonizing
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Pain](http://www.cs.cmu.edu/~quake-papers/painless-conjugate-gradient.pdf) by Jonathan Richard
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Shewchuk. The method can be seen as an adaptation of a standard Conjugate Gradient method (see, for
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example <http://en.wikipedia.org/wiki/Conjugate_gradient_method>) for numerically solving the
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systems of linear equations.
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It should be noted, that this method, although deterministic, is rather a heuristic method and
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therefore may converge to a local minima, not necessary a global one. What is even more disastrous,
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most of its behaviour is ruled by gradient, therefore it essentially cannot distinguish between
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local minima and maxima. Therefore, if it starts sufficiently near to the local maximum, it may
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converge to it. Another obvious restriction is that it should be possible to compute the gradient of
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a function at any point, thus it is preferable to have analytic expression for gradient and
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computational burden should be born by the user.
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The latter responsibility is accompilished via the getGradient method of a
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MinProblemSolver::Function interface (which represents function being optimized). This method takes
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point a point in *n*-dimensional space (first argument represents the array of coordinates of that
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point) and comput its gradient (it should be stored in the second argument as an array).
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@note class ConjGradSolver thus does not add any new methods to the basic MinProblemSolver interface.
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@note term criteria should meet following condition:
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@code
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termcrit.type == (TermCriteria::MAX_ITER + TermCriteria::EPS) && termcrit.epsilon > 0 && termcrit.maxCount > 0
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// or
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termcrit.type == TermCriteria::MAX_ITER) && termcrit.maxCount > 0
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@endcode
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*/
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class CV_EXPORTS ConjGradSolver : public MinProblemSolver
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{
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public:
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/** @brief This function returns the reference to the ready-to-use ConjGradSolver object.
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All the parameters are optional, so this procedure can be called even without parameters at
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all. In this case, the default values will be used. As default value for terminal criteria are
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the only sensible ones, MinProblemSolver::setFunction() should be called upon the obtained
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object, if the function was not given to create(). Otherwise, the two ways (submit it to
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create() or miss it out and call the MinProblemSolver::setFunction()) are absolutely equivalent
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(and will drop the same errors in the same way, should invalid input be detected).
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@param f Pointer to the function that will be minimized, similarly to the one you submit via
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MinProblemSolver::setFunction.
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@param termcrit Terminal criteria to the algorithm, similarly to the one you submit via
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MinProblemSolver::setTermCriteria.
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*/
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static Ptr<ConjGradSolver> create(const Ptr<MinProblemSolver::Function>& f=Ptr<ConjGradSolver::Function>(),
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TermCriteria termcrit=TermCriteria(TermCriteria::MAX_ITER+TermCriteria::EPS,5000,0.000001));
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};
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//! return codes for cv::solveLP() function
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enum SolveLPResult
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{
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SOLVELP_UNBOUNDED = -2, //!< problem is unbounded (target function can achieve arbitrary high values)
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SOLVELP_UNFEASIBLE = -1, //!< problem is unfeasible (there are no points that satisfy all the constraints imposed)
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SOLVELP_SINGLE = 0, //!< there is only one maximum for target function
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SOLVELP_MULTI = 1 //!< there are multiple maxima for target function - the arbitrary one is returned
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};
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/** @brief Solve given (non-integer) linear programming problem using the Simplex Algorithm (Simplex Method).
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What we mean here by "linear programming problem" (or LP problem, for short) can be formulated as:
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\f[\mbox{Maximize } c\cdot x\\
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\mbox{Subject to:}\\
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Ax\leq b\\
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x\geq 0\f]
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Where \f$c\f$ is fixed `1`-by-`n` row-vector, \f$A\f$ is fixed `m`-by-`n` matrix, \f$b\f$ is fixed `m`-by-`1`
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column vector and \f$x\f$ is an arbitrary `n`-by-`1` column vector, which satisfies the constraints.
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Simplex algorithm is one of many algorithms that are designed to handle this sort of problems
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efficiently. Although it is not optimal in theoretical sense (there exist algorithms that can solve
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any problem written as above in polynomial time, while simplex method degenerates to exponential
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time for some special cases), it is well-studied, easy to implement and is shown to work well for
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real-life purposes.
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The particular implementation is taken almost verbatim from **Introduction to Algorithms, third
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edition** by T. H. Cormen, C. E. Leiserson, R. L. Rivest and Clifford Stein. In particular, the
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Bland's rule <http://en.wikipedia.org/wiki/Bland%27s_rule> is used to prevent cycling.
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@param Func This row-vector corresponds to \f$c\f$ in the LP problem formulation (see above). It should
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contain 32- or 64-bit floating point numbers. As a convenience, column-vector may be also submitted,
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in the latter case it is understood to correspond to \f$c^T\f$.
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@param Constr `m`-by-`n+1` matrix, whose rightmost column corresponds to \f$b\f$ in formulation above
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and the remaining to \f$A\f$. It should containt 32- or 64-bit floating point numbers.
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@param z The solution will be returned here as a column-vector - it corresponds to \f$c\f$ in the
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formulation above. It will contain 64-bit floating point numbers.
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@return One of cv::SolveLPResult
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*/
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CV_EXPORTS_W int solveLP(const Mat& Func, const Mat& Constr, Mat& z);
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//! @}
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}// cv
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#endif
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