Mercurial > octave-nkf
view scripts/optimization/lsqnonneg.m @ 14868:5d3a684236b0
maint: Use Octave coding conventions for cuddling parentheses in scripts directory
* lin2mu.m, loadaudio.m, wavread.m, accumarray.m, bicubic.m, celldisp.m,
colon.m, cplxpair.m, dblquad.m, divergence.m, genvarname.m, gradient.m,
int2str.m, interp1.m, interp1q.m, interp2.m, interpn.m, loadobj.m, nthargout.m,
__isequal__.m, __splinen__.m, quadgk.m, quadl.m, quadv.m, rat.m, rot90.m,
rotdim.m, saveobj.m, subsindex.m, triplequad.m, delaunay3.m, griddata.m,
inpolygon.m, tsearchn.m, voronoi.m, get_first_help_sentence.m, which.m,
gray2ind.m, pink.m, dlmwrite.m, strread.m, textread.m, textscan.m, housh.m,
ishermitian.m, issymmetric.m, krylov.m, logm.m, null.m, rref.m,
compare_versions.m, copyfile.m, dump_prefs.m, edit.m, fileparts.m,
getappdata.m, isappdata.m, movefile.m, orderfields.m, parseparams.m,
__xzip__.m, rmappdata.m, setappdata.m, swapbytes.m, unpack.m, ver.m, fminbnd.m,
fminunc.m, fsolve.m, glpk.m, lsqnonneg.m, qp.m, sqp.m, configure_make.m,
copy_files.m, describe.m, get_description.m, get_forge_pkg.m, install.m,
installed_packages.m, is_architecture_dependent.m, load_package_dirs.m,
print_package_description.m, rebuild.m, repackage.m, save_order.m, shell.m,
allchild.m, ancestor.m, area.m, axes.m, axis.m, clabel.m, close.m, colorbar.m,
comet.m, comet3.m, contour.m, cylinder.m, ezmesh.m, ezsurf.m, findobj.m,
fplot.m, hist.m, isocolors.m, isonormals.m, isosurface.m, isprop.m, legend.m,
mesh.m, meshz.m, pareto.m, pcolor.m, peaks.m, plot3.m, plotmatrix.m, plotyy.m,
polar.m, print.m, __add_datasource__.m, __add_default_menu__.m,
__axes_limits__.m, __bar__.m, __clabel__.m, __contour__.m, __errcomm__.m,
__errplot__.m, __ezplot__.m, __file_filter__.m, __fltk_print__.m,
__ghostscript__.m, __gnuplot_print__.m, __go_draw_axes__.m,
__go_draw_figure__.m, __interp_cube__.m, __marching_cube__.m, __patch__.m,
__pie__.m, __plt__.m, __print_parse_opts__.m, __quiver__.m, __scatter__.m,
__stem__.m, __tight_eps_bbox__.m, __uigetdir_fltk__.m, __uigetfile_fltk__.m,
__uiputfile_fltk__.m, quiver.m, quiver3.m, rectangle.m, refreshdata.m,
ribbon.m, scatter.m, semilogy.m, shading.m, slice.m, subplot.m, surface.m,
surfl.m, surfnorm.m, text.m, uigetfile.m, uiputfile.m, whitebg.m, deconv.m,
mkpp.m, pchip.m, polyaffine.m, polyder.m, polygcd.m, polyout.m, polyval.m,
ppint.m, ppjumps.m, ppval.m, residue.m, roots.m, spline.m, splinefit.m,
addpref.m, getpref.m, setpref.m, ismember.m, setxor.m, arch_fit.m, arch_rnd.m,
arch_test.m, autoreg_matrix.m, diffpara.m, fftconv.m, filter2.m, hanning.m,
hurst.m, periodogram.m, triangle_sw.m, sinc.m, spectral_xdf.m, spencer.m,
stft.m, synthesis.m, unwrap.m, yulewalker.m, bicgstab.m, gmres.m, pcg.m, pcr.m,
__sprand_impl__.m, speye.m, spfun.m, sprandn.m, spstats.m, svds.m,
treelayout.m, treeplot.m, bessel.m, factor.m, legendre.m, perms.m, primes.m,
magic.m, toeplitz.m, corr.m, cov.m, mean.m, median.m, mode.m, qqplot.m,
quantile.m, ranks.m, zscore.m, logistic_regression_likelihood.m,
bartlett_test.m, chisquare_test_homogeneity.m, chisquare_test_independence.m,
kolmogorov_smirnov_test.m, run_test.m, u_test.m, wilcoxon_test.m, z_test.m,
z_test_2.m, bin2dec.m, dec2base.m, mat2str.m, strcat.m, strchr.m, strjust.m,
strtok.m, substr.m, untabify.m, assert.m, demo.m, example.m, fail.m, speed.m,
test.m, now.m: Use Octave coding conventions for cuddling parentheses in
scripts directory.
| author | Rik <octave@nomad.inbox5.com> |
|---|---|
| date | Tue, 17 Jul 2012 07:08:39 -0700 |
| parents | acb09716fc94 |
| children | 7eff3032d144 |
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## Copyright (C) 2008-2012 Bill Denney ## Copyright (C) 2008 Jaroslav Hajek ## Copyright (C) 2009 VZLU Prague ## ## This file is part of Octave. ## ## Octave is free software; you can redistribute it and/or modify it ## under the terms of the GNU General Public License as published by ## the Free Software Foundation; either version 3 of the License, or (at ## your option) any later version. ## ## Octave is distributed in the hope that it will be useful, but ## WITHOUT ANY WARRANTY; without even the implied warranty of ## MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the GNU ## General Public License for more details. ## ## You should have received a copy of the GNU General Public License ## along with Octave; see the file COPYING. If not, see ## <http://www.gnu.org/licenses/>. ## -*- texinfo -*- ## @deftypefn {Function File} {@var{x} =} lsqnonneg (@var{c}, @var{d}) ## @deftypefnx {Function File} {@var{x} =} lsqnonneg (@var{c}, @var{d}, @var{x0}) ## @deftypefnx {Function File} {@var{x} =} lsqnonneg (@var{c}, @var{d}, @var{x0}, @var{options}) ## @deftypefnx {Function File} {[@var{x}, @var{resnorm}] =} lsqnonneg (@dots{}) ## @deftypefnx {Function File} {[@var{x}, @var{resnorm}, @var{residual}] =} lsqnonneg (@dots{}) ## @deftypefnx {Function File} {[@var{x}, @var{resnorm}, @var{residual}, @var{exitflag}] =} lsqnonneg (@dots{}) ## @deftypefnx {Function File} {[@var{x}, @var{resnorm}, @var{residual}, @var{exitflag}, @var{output}] =} lsqnonneg (@dots{}) ## @deftypefnx {Function File} {[@var{x}, @var{resnorm}, @var{residual}, @var{exitflag}, @var{output}, @var{lambda}] =} lsqnonneg (@dots{}) ## Minimize @code{norm (@var{c}*@var{x} - d)} subject to ## @code{@var{x} >= 0}. @var{c} and @var{d} must be real. @var{x0} is an ## optional initial guess for @var{x}. ## Currently, @code{lsqnonneg} ## recognizes these options: @code{"MaxIter"}, @code{"TolX"}. ## For a description of these options, see @ref{doc-optimset,,optimset}. ## ## Outputs: ## ## @itemize @bullet ## @item resnorm ## ## The squared 2-norm of the residual: norm (@var{c}*@var{x}-@var{d})^2 ## ## @item residual ## ## The residual: @var{d}-@var{c}*@var{x} ## ## @item exitflag ## ## An indicator of convergence. 0 indicates that the iteration count ## was exceeded, and therefore convergence was not reached; >0 indicates ## that the algorithm converged. (The algorithm is stable and will ## converge given enough iterations.) ## ## @item output ## ## A structure with two fields: ## ## @itemize @bullet ## @item "algorithm": The algorithm used ("nnls") ## ## @item "iterations": The number of iterations taken. ## @end itemize ## ## @item lambda ## ## Not implemented. ## @end itemize ## @seealso{optimset, pqpnonneg} ## @end deftypefn ## PKG_ADD: ## Discard result to avoid polluting workspace with ans at startup. ## PKG_ADD: [~] = __all_opts__ ("lsqnonneg"); ## This is implemented from Lawson and Hanson's 1973 algorithm on page ## 161 of Solving Least Squares Problems. function [x, resnorm, residual, exitflag, output, lambda] = lsqnonneg (c, d, x = [], options = struct ()) if (nargin == 1 && ischar (c) && strcmp (c, 'defaults')) x = optimset ("MaxIter", 1e5); return endif if (! (nargin >= 2 && nargin <= 4 && ismatrix (c) && ismatrix (d) && isstruct (options))) print_usage (); endif ## Lawson-Hanson Step 1 (LH1): initialize the variables. m = rows (c); n = columns (c); if (isempty (x)) ## Initial guess is 0s. x = zeros (n, 1); else ## ensure nonnegative guess. x = max (x, 0); endif useqr = m >= n; max_iter = optimget (options, "MaxIter", 1e5); ## Initialize P, according to zero pattern of x. p = find (x > 0).'; if (useqr) ## Initialize the QR factorization, economized form. [q, r] = qr (c(:,p), 0); endif iter = 0; ## LH3: test for completion. while (iter < max_iter) while (iter < max_iter) iter++; ## LH6: compute the positive matrix and find the min norm solution ## of the positive problem. if (useqr) xtmp = r \ q'*d; else xtmp = c(:,p) \ d; endif idx = find (xtmp < 0); if (isempty (idx)) ## LH7: tmp solution found, iterate. x(:) = 0; x(p) = xtmp; break; else ## LH8, LH9: find the scaling factor. pidx = p(idx); sf = x(pidx)./(x(pidx) - xtmp(idx)); alpha = min (sf); ## LH10: adjust X. xx = zeros (n, 1); xx(p) = xtmp; x += alpha*(xx - x); ## LH11: move from P to Z all X == 0. ## This corresponds to those indices where minimum of sf is attained. idx = idx (sf == alpha); p(idx) = []; if (useqr) ## update the QR factorization. [q, r] = qrdelete (q, r, idx); endif endif endwhile ## compute the gradient. w = c'*(d - c*x); w(p) = []; tolx = optimget (options, "TolX", 10*eps*norm (c, 1)*length (c)); if (! any (w > tolx)) if (useqr) ## verify the solution achieved using qr updating. ## in the best case, this should only take a single step. useqr = false; continue; else ## we're finished. break; endif endif ## find the maximum gradient. idx = find (w == max (w)); if (numel (idx) > 1) warning ("lsqnonneg:nonunique", "a non-unique solution may be returned due to equal gradients"); idx = idx(1); endif ## move the index from Z to P. Keep P sorted. z = [1:n]; z(p) = []; zidx = z(idx); jdx = 1 + lookup (p, zidx); p = [p(1:jdx-1), zidx, p(jdx:end)]; if (useqr) ## insert the column into the QR factorization. [q, r] = qrinsert (q, r, jdx, c(:,zidx)); endif endwhile ## LH12: complete. ## Generate the additional output arguments. if (nargout > 1) resnorm = norm (c*x - d) ^ 2; endif if (nargout > 2) residual = d - c*x; endif exitflag = iter; if (nargout > 3 && iter >= max_iter) exitflag = 0; endif if (nargout > 4) output = struct ("algorithm", "nnls", "iterations", iter); endif if (nargout > 5) lambda = zeros (size (x)); lambda(p) = w; endif endfunction %!test %! C = [1 0;0 1;2 1]; %! d = [1;3;-2]; %! assert (lsqnonneg (C, d), [0;0.5], 100*eps); %!test %! C = [0.0372 0.2869;0.6861 0.7071;0.6233 0.6245;0.6344 0.6170]; %! d = [0.8587;0.1781;0.0747;0.8405]; %! xnew = [0;0.6929]; %! assert (lsqnonneg (C, d), xnew, 0.0001);