203 lines
6.5 KiB
C++
203 lines
6.5 KiB
C++
// This file is part of Eigen, a lightweight C++ template library
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// for linear algebra.
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//
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// Copyright (C) 2009 Thomas Capricelli <orzel@freehackers.org>
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//
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// This code initially comes from MINPACK whose original authors are:
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// Copyright Jorge More - Argonne National Laboratory
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// Copyright Burt Garbow - Argonne National Laboratory
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// Copyright Ken Hillstrom - Argonne National Laboratory
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//
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// This Source Code Form is subject to the terms of the Minpack license
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// (a BSD-like license) described in the campaigned CopyrightMINPACK.txt file.
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#ifndef EIGEN_LMONESTEP_H
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#define EIGEN_LMONESTEP_H
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namespace Eigen {
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template<typename FunctorType>
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LevenbergMarquardtSpace::Status
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LevenbergMarquardt<FunctorType>::minimizeOneStep(FVectorType &x)
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{
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using std::abs;
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using std::sqrt;
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RealScalar temp, temp1,temp2;
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RealScalar ratio;
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RealScalar pnorm, xnorm, fnorm1, actred, dirder, prered;
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eigen_assert(x.size()==n); // check the caller is not cheating us
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temp = 0.0; xnorm = 0.0;
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/* calculate the jacobian matrix. */
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Index df_ret = m_functor.df(x, m_fjac);
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if (df_ret<0)
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return LevenbergMarquardtSpace::UserAsked;
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if (df_ret>0)
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// numerical diff, we evaluated the function df_ret times
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m_nfev += df_ret;
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else m_njev++;
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/* compute the qr factorization of the jacobian. */
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for (int j = 0; j < x.size(); ++j)
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m_wa2(j) = m_fjac.col(j).blueNorm();
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QRSolver qrfac(m_fjac);
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if(qrfac.info() != Success) {
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m_info = NumericalIssue;
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return LevenbergMarquardtSpace::ImproperInputParameters;
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}
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// Make a copy of the first factor with the associated permutation
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m_rfactor = qrfac.matrixR();
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m_permutation = (qrfac.colsPermutation());
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/* on the first iteration and if external scaling is not used, scale according */
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/* to the norms of the columns of the initial jacobian. */
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if (m_iter == 1) {
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if (!m_useExternalScaling)
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for (Index j = 0; j < n; ++j)
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m_diag[j] = (m_wa2[j]==0.)? 1. : m_wa2[j];
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/* on the first iteration, calculate the norm of the scaled x */
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/* and initialize the step bound m_delta. */
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xnorm = m_diag.cwiseProduct(x).stableNorm();
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m_delta = m_factor * xnorm;
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if (m_delta == 0.)
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m_delta = m_factor;
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}
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/* form (q transpose)*m_fvec and store the first n components in */
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/* m_qtf. */
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m_wa4 = m_fvec;
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m_wa4 = qrfac.matrixQ().adjoint() * m_fvec;
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m_qtf = m_wa4.head(n);
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/* compute the norm of the scaled gradient. */
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m_gnorm = 0.;
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if (m_fnorm != 0.)
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for (Index j = 0; j < n; ++j)
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if (m_wa2[m_permutation.indices()[j]] != 0.)
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m_gnorm = (std::max)(m_gnorm, abs( m_rfactor.col(j).head(j+1).dot(m_qtf.head(j+1)/m_fnorm) / m_wa2[m_permutation.indices()[j]]));
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/* test for convergence of the gradient norm. */
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if (m_gnorm <= m_gtol) {
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m_info = Success;
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return LevenbergMarquardtSpace::CosinusTooSmall;
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}
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/* rescale if necessary. */
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if (!m_useExternalScaling)
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m_diag = m_diag.cwiseMax(m_wa2);
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do {
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/* determine the levenberg-marquardt parameter. */
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internal::lmpar2(qrfac, m_diag, m_qtf, m_delta, m_par, m_wa1);
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/* store the direction p and x + p. calculate the norm of p. */
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m_wa1 = -m_wa1;
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m_wa2 = x + m_wa1;
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pnorm = m_diag.cwiseProduct(m_wa1).stableNorm();
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/* on the first iteration, adjust the initial step bound. */
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if (m_iter == 1)
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m_delta = (std::min)(m_delta,pnorm);
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/* evaluate the function at x + p and calculate its norm. */
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if ( m_functor(m_wa2, m_wa4) < 0)
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return LevenbergMarquardtSpace::UserAsked;
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++m_nfev;
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fnorm1 = m_wa4.stableNorm();
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/* compute the scaled actual reduction. */
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actred = -1.;
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if (Scalar(.1) * fnorm1 < m_fnorm)
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actred = 1. - numext::abs2(fnorm1 / m_fnorm);
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/* compute the scaled predicted reduction and */
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/* the scaled directional derivative. */
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m_wa3 = m_rfactor.template triangularView<Upper>() * (m_permutation.inverse() *m_wa1);
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temp1 = numext::abs2(m_wa3.stableNorm() / m_fnorm);
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temp2 = numext::abs2(sqrt(m_par) * pnorm / m_fnorm);
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prered = temp1 + temp2 / Scalar(.5);
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dirder = -(temp1 + temp2);
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/* compute the ratio of the actual to the predicted */
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/* reduction. */
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ratio = 0.;
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if (prered != 0.)
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ratio = actred / prered;
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/* update the step bound. */
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if (ratio <= Scalar(.25)) {
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if (actred >= 0.)
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temp = RealScalar(.5);
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if (actred < 0.)
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temp = RealScalar(.5) * dirder / (dirder + RealScalar(.5) * actred);
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if (RealScalar(.1) * fnorm1 >= m_fnorm || temp < RealScalar(.1))
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temp = Scalar(.1);
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/* Computing MIN */
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m_delta = temp * (std::min)(m_delta, pnorm / RealScalar(.1));
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m_par /= temp;
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} else if (!(m_par != 0. && ratio < RealScalar(.75))) {
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m_delta = pnorm / RealScalar(.5);
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m_par = RealScalar(.5) * m_par;
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}
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/* test for successful iteration. */
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if (ratio >= RealScalar(1e-4)) {
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/* successful iteration. update x, m_fvec, and their norms. */
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x = m_wa2;
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m_wa2 = m_diag.cwiseProduct(x);
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m_fvec = m_wa4;
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xnorm = m_wa2.stableNorm();
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m_fnorm = fnorm1;
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++m_iter;
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}
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/* tests for convergence. */
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if (abs(actred) <= m_ftol && prered <= m_ftol && Scalar(.5) * ratio <= 1. && m_delta <= m_xtol * xnorm)
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{
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m_info = Success;
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return LevenbergMarquardtSpace::RelativeErrorAndReductionTooSmall;
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}
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if (abs(actred) <= m_ftol && prered <= m_ftol && Scalar(.5) * ratio <= 1.)
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{
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m_info = Success;
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return LevenbergMarquardtSpace::RelativeReductionTooSmall;
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}
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if (m_delta <= m_xtol * xnorm)
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{
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m_info = Success;
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return LevenbergMarquardtSpace::RelativeErrorTooSmall;
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}
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/* tests for termination and stringent tolerances. */
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if (m_nfev >= m_maxfev)
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{
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m_info = NoConvergence;
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return LevenbergMarquardtSpace::TooManyFunctionEvaluation;
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}
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if (abs(actred) <= NumTraits<Scalar>::epsilon() && prered <= NumTraits<Scalar>::epsilon() && Scalar(.5) * ratio <= 1.)
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{
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m_info = Success;
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return LevenbergMarquardtSpace::FtolTooSmall;
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}
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if (m_delta <= NumTraits<Scalar>::epsilon() * xnorm)
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{
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m_info = Success;
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return LevenbergMarquardtSpace::XtolTooSmall;
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}
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if (m_gnorm <= NumTraits<Scalar>::epsilon())
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{
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m_info = Success;
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return LevenbergMarquardtSpace::GtolTooSmall;
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}
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} while (ratio < Scalar(1e-4));
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return LevenbergMarquardtSpace::Running;
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}
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} // end namespace Eigen
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#endif // EIGEN_LMONESTEP_H
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