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466 lines
16 KiB
C++
466 lines
16 KiB
C++
/*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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#include "precomp.hpp"
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#if 0
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#define dprintf(x) printf x
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#define print_matrix(x) print(x)
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#else
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#define dprintf(x)
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#define print_matrix(x)
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#endif
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/*
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****Error Message********************************************************************************************************************
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Downhill Simplex method in OpenCV dev 3.0.0 getting this error:
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OpenCV Error: Assertion failed (dims <= 2 && data && (unsigned)i0 < (unsigned)(s ize.p[0] * size.p[1])
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&& elemSize() == (((((DataType<_Tp>::type) & ((512 - 1) << 3)) >> 3) + 1) << ((((sizeof(size_t)/4+1)16384|0x3a50)
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>> ((DataType<_Tp>::typ e) & ((1 << 3) - 1))2) & 3))) in Mat::at,
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file C:\builds\master_PackSlave-w in32-vc12-shared\opencv\modules\core\include\opencv2/core/mat.inl.hpp, line 893
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****Problem and Possible Fix*********************************************************************************************************
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DownhillSolverImpl::innerDownhillSimplex something looks broken here:
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Mat_<double> coord_sum(1,ndim,0.0),buf(1,ndim,0.0),y(1,ndim,0.0);
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fcount = 0;
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for(i=0;i<ndim+1;++i)
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{
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y(i) = f->calc(p[i]);
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}
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y has only ndim elements, while the loop goes over ndim+1
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Edited the following for possible fix:
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Replaced y(1,ndim,0.0) ------> y(1,ndim+1,0.0)
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***********************************************************************************************************************************
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The code below was used in tesing the source code.
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Created by @SareeAlnaghy
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#include <iostream>
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#include <cstdlib>
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#include <cmath>
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#include <algorithm>
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#include <opencv2\optim\optim.hpp>
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using namespace std;
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using namespace cv;
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void test(Ptr<optim::DownhillSolver> MinProblemSolver, Ptr<optim::MinProblemSolver::Function> ptr_F, Mat &P, Mat &step)
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{
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try{
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MinProblemSolver->setFunction(ptr_F);
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MinProblemSolver->setInitStep(step);
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double res = MinProblemSolver->minimize(P);
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cout << "res " << res << endl;
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}
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catch (exception e)
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{
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cerr << "Error:: " << e.what() << endl;
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}
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}
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int main()
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{
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class DistanceToLines :public optim::MinProblemSolver::Function {
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public:
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double calc(const double* x)const{
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return x[0] * x[0] + x[1] * x[1];
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}
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};
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Mat P = (Mat_<double>(1, 2) << 1.0, 1.0);
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Mat step = (Mat_<double>(2, 1) << -0.5, 0.5);
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Ptr<optim::MinProblemSolver::Function> ptr_F(new DistanceToLines());
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Ptr<optim::DownhillSolver> MinProblemSolver = optim::createDownhillSolver();
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test(MinProblemSolver, ptr_F, P, step);
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system("pause");
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return 0;
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}
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****Suggesttion for imporving Simplex implentation***************************************************************************************
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Currently the downhilll simplex method outputs the function value that is minimized. It should also return the coordinate points where the
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function is minimized. This is very useful in many applications such as using back projection methods to find a point of intersection of
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multiple lines in three dimensions as not all lines intersect in three dimensions.
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*/
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namespace cv
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{
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class DownhillSolverImpl : public DownhillSolver
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{
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public:
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DownhillSolverImpl()
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{
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_Function=Ptr<Function>();
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_step=Mat_<double>();
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}
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void getInitStep(OutputArray step) const { _step.copyTo(step); }
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void setInitStep(InputArray step)
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{
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// set dimensionality and make a deep copy of step
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Mat m = step.getMat();
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dprintf(("m.cols=%d\nm.rows=%d\n", m.cols, m.rows));
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if( m.rows == 1 )
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m.copyTo(_step);
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else
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transpose(m, _step);
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}
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Ptr<MinProblemSolver::Function> getFunction() const { return _Function; }
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void setFunction(const Ptr<Function>& f) { _Function=f; }
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TermCriteria getTermCriteria() const { return _termcrit; }
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void setTermCriteria( const TermCriteria& termcrit )
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{
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CV_Assert( termcrit.type == (TermCriteria::MAX_ITER + TermCriteria::EPS) &&
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termcrit.epsilon > 0 &&
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termcrit.maxCount > 0 );
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_termcrit=termcrit;
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}
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double minimize( InputOutputArray x_ )
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{
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dprintf(("hi from minimize\n"));
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CV_Assert( !_Function.empty() );
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CV_Assert( std::min(_step.cols, _step.rows) == 1 &&
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std::max(_step.cols, _step.rows) >= 2 &&
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_step.type() == CV_64FC1 );
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dprintf(("termcrit:\n\ttype: %d\n\tmaxCount: %d\n\tEPS: %g\n",_termcrit.type,_termcrit.maxCount,_termcrit.epsilon));
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dprintf(("step\n"));
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print_matrix(_step);
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Mat x = x_.getMat(), simplex;
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createInitialSimplex(x, simplex, _step);
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int count = 0;
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double res = innerDownhillSimplex(simplex,_termcrit.epsilon, _termcrit.epsilon,
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count, _termcrit.maxCount);
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dprintf(("%d iterations done\n",count));
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if( !x.empty() )
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{
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Mat simplex_0m(x.rows, x.cols, CV_64F, simplex.ptr<double>());
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simplex_0m.convertTo(x, x.type());
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}
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else
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{
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int x_type = x_.fixedType() ? x_.type() : CV_64F;
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simplex.row(0).convertTo(x_, x_type);
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}
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return res;
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}
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protected:
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Ptr<MinProblemSolver::Function> _Function;
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TermCriteria _termcrit;
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Mat _step;
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inline void updateCoordSum(const Mat& p, Mat& coord_sum)
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{
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int i, j, m = p.rows, n = p.cols;
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double* coord_sum_ = coord_sum.ptr<double>();
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CV_Assert( coord_sum.cols == n && coord_sum.rows == 1 );
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for( j = 0; j < n; j++ )
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coord_sum_[j] = 0.;
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for( i = 0; i < m; i++ )
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{
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const double* p_i = p.ptr<double>(i);
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for( j = 0; j < n; j++ )
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coord_sum_[j] += p_i[j];
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}
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dprintf(("\nupdated coord sum:\n"));
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print_matrix(coord_sum);
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}
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inline void createInitialSimplex( const Mat& x0, Mat& simplex, Mat& step )
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{
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int i, j, ndim = step.cols;
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CV_Assert( _Function->getDims() == ndim );
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Mat x = x0;
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if( x0.empty() )
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x = Mat::zeros(1, ndim, CV_64F);
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CV_Assert( (x.cols == 1 && x.rows == ndim) || (x.cols == ndim && x.rows == 1) );
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CV_Assert( x.type() == CV_32F || x.type() == CV_64F );
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simplex.create(ndim + 1, ndim, CV_64F);
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Mat simplex_0m(x.rows, x.cols, CV_64F, simplex.ptr<double>());
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x.convertTo(simplex_0m, CV_64F);
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double* simplex_0 = simplex.ptr<double>();
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const double* step_ = step.ptr<double>();
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for( i = 1; i <= ndim; i++ )
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{
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double* simplex_i = simplex.ptr<double>(i);
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for( j = 0; j < ndim; j++ )
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simplex_i[j] = simplex_0[j];
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simplex_i[i-1] += 0.5*step_[i-1];
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}
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for( j = 0; j < ndim; j++ )
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simplex_0[j] -= 0.5*step_[j];
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dprintf(("\nthis is simplex\n"));
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print_matrix(simplex);
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}
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/*
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Performs the actual minimization of MinProblemSolver::Function f (after the initialization was done)
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The matrix p[ndim+1][1..ndim] represents ndim+1 vertices that
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form a simplex - each row is an ndim vector.
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On output, fcount gives the number of function evaluations taken.
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*/
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double innerDownhillSimplex( Mat& p, double MinRange, double MinError, int& fcount, int nmax )
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{
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int i, j, ndim = p.cols;
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Mat coord_sum(1, ndim, CV_64F), buf(1, ndim, CV_64F), y(1, ndim+1, CV_64F);
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double* y_ = y.ptr<double>();
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fcount = ndim+1;
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for( i = 0; i <= ndim; i++ )
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y_[i] = calc_f(p.ptr<double>(i));
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updateCoordSum(p, coord_sum);
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for (;;)
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{
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// find highest (worst), next-to-worst, and lowest
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// (best) points by going through all of them.
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int ilo = 0, ihi, inhi;
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if( y_[0] > y_[1] )
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{
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ihi = 0; inhi = 1;
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}
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else
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{
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ihi = 1; inhi = 0;
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}
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for( i = 0; i <= ndim; i++ )
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{
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double yval = y_[i];
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if (yval <= y_[ilo])
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ilo = i;
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if (yval > y_[ihi])
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{
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inhi = ihi;
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ihi = i;
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}
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else if (yval > y_[inhi] && i != ihi)
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inhi = i;
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}
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CV_Assert( ihi != inhi );
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if( ilo == inhi || ilo == ihi )
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{
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for( i = 0; i <= ndim; i++ )
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{
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double yval = y_[i];
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if( yval == y_[ilo] && i != ihi && i != inhi )
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{
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ilo = i;
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break;
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}
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}
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}
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dprintf(("\nthis is y on iteration %d:\n",fcount));
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print_matrix(y);
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// check stop criterion
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double error = fabs(y_[ihi] - y_[ilo]);
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double range = 0;
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for( j = 0; j < ndim; j++ )
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{
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double minval, maxval;
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minval = maxval = p.at<double>(0, j);
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for( i = 1; i <= ndim; i++ )
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{
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double pval = p.at<double>(i, j);
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minval = std::min(minval, pval);
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maxval = std::max(maxval, pval);
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}
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range = std::max(range, fabs(maxval - minval));
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}
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if( range <= MinRange || error <= MinError || fcount >= nmax )
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{
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// Put best point and value in first slot.
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std::swap(y_[0], y_[ilo]);
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for( j = 0; j < ndim; j++ )
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{
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std::swap(p.at<double>(0, j), p.at<double>(ilo, j));
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}
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break;
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}
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double y_lo = y_[ilo], y_nhi = y_[inhi], y_hi = y_[ihi];
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// Begin a new iteration. First, reflect the worst point about the centroid of others
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double alpha = -1.0;
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double y_alpha = tryNewPoint(p, coord_sum, ihi, alpha, buf, fcount);
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dprintf(("\ny_lo=%g, y_nhi=%g, y_hi=%g, y_alpha=%g, p_alpha:\n", y_lo, y_nhi, y_hi, y_alpha));
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print_matrix(buf);
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if( y_alpha < y_nhi )
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{
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if( y_alpha < y_lo )
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{
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// If that's better than the best point, go twice as far in that direction
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double beta = -2.0;
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double y_beta = tryNewPoint(p, coord_sum, ihi, beta, buf, fcount);
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dprintf(("\ny_beta=%g, p_beta:\n", y_beta));
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print_matrix(buf);
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if( y_beta < y_alpha )
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{
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alpha = beta;
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y_alpha = y_beta;
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}
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}
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replacePoint(p, coord_sum, y, ihi, alpha, y_alpha);
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}
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else
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{
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// The new point is worse than the second-highest,
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// do not go so far in that direction
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double gamma = 0.5;
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double y_gamma = tryNewPoint(p, coord_sum, ihi, gamma, buf, fcount);
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dprintf(("\ny_gamma=%g, p_gamma:\n", y_gamma));
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print_matrix(buf);
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if( y_gamma < y_hi )
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replacePoint(p, coord_sum, y, ihi, gamma, y_gamma);
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else
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{
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// Can't seem to improve things.
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// Contract the simplex to good point
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// in hope to find a simplex landscape.
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for( i = 0; i <= ndim; i++ )
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{
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if (i != ilo)
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{
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for( j = 0; j < ndim; j++ )
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p.at<double>(i, j) = 0.5*(p.at<double>(i, j) + p.at<double>(ilo, j));
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y_[i] = calc_f(p.ptr<double>(i));
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}
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}
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fcount += ndim;
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updateCoordSum(p, coord_sum);
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}
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}
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dprintf(("\nthis is simplex on iteration %d\n",fcount));
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print_matrix(p);
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}
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return y_[0];
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}
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inline double calc_f(const double* ptr)
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{
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double res = _Function->calc(ptr);
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CV_Assert( !cvIsNaN(res) && !cvIsInf(res) );
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return res;
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}
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double tryNewPoint( Mat& p, Mat& coord_sum, int ihi, double alpha_, Mat& ptry, int& fcount )
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{
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int j, ndim = p.cols;
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double alpha = (1.0 - alpha_)/ndim;
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double beta = alpha - alpha_;
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double* p_ihi = p.ptr<double>(ihi);
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double* ptry_ = ptry.ptr<double>();
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double* coord_sum_ = coord_sum.ptr<double>();
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for( j = 0; j < ndim; j++ )
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ptry_[j] = coord_sum_[j]*alpha - p_ihi[j]*beta;
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fcount++;
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return calc_f(ptry_);
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}
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void replacePoint( Mat& p, Mat& coord_sum, Mat& y, int ihi, double alpha_, double ytry )
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{
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int j, ndim = p.cols;
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double alpha = (1.0 - alpha_)/ndim;
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double beta = alpha - alpha_;
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double* p_ihi = p.ptr<double>(ihi);
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double* coord_sum_ = coord_sum.ptr<double>();
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for( j = 0; j < ndim; j++ )
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p_ihi[j] = coord_sum_[j]*alpha - p_ihi[j]*beta;
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y.at<double>(ihi) = ytry;
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updateCoordSum(p, coord_sum);
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}
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};
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// both minRange & minError are specified by termcrit.epsilon;
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// In addition, user may specify the number of iterations that the algorithm does.
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Ptr<DownhillSolver> DownhillSolver::create( const Ptr<MinProblemSolver::Function>& f,
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InputArray initStep, TermCriteria termcrit )
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{
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Ptr<DownhillSolver> DS = makePtr<DownhillSolverImpl>();
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DS->setFunction(f);
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DS->setInitStep(initStep);
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DS->setTermCriteria(termcrit);
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return DS;
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}
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}
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