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author | Daniele Nicolodi <nicolodi@science.unitn.it> |
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date | Mon, 05 Dec 2011 16:20:06 +0100 |
parents | f0afece42f48 |
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% QQPLOT makes quantile-quantile plot %%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% % % h = qqplot(y1,[],ops) Plot a quantile-quantile plot comparing with % theoretical model. % % h = cdfplot(y1,y2,ops) Plot a quantile-quantile plot comparing two % empirical cdfs. % % ops is a cell aray of options % - 'ProbDist' -> theoretical distribution. Available distributions are: % - 'Fdist' -> F cumulative distribution function. In this case the % parameter 'params' should be a vector with distribution degrees of % freedoms [dof1 dof2] % - 'Normdist' -> Normal cumulative distribution function. In this case % the parameter 'params' should be a vector with distribution mean and % standard deviation [mu sigma] % - 'Chi2dist' -> Chi square cumulative distribution function. In this % case the parameter 'params' should be a number indicating % distribution degrees of freedom % - 'GammaDist' -> Gamma distribution. 'params' should contain the % shape and scale parameters % - 'ShapeParam' -> In the case of comparison of a data series with a % theoretical distribution and the data series is composed of correlated % elements. K can be adjusted with a shape parameter in order to recover % test fairness. In such a case the test is performed for K* = Phi *K. % Phi is the corresponding Shape parameter. The shape parameter depends % on the correlations and on the significance value. It does not depend % on data length. % - 'params' -> Probability distribution parameters % - 'conflevel' -> requiered confidence for confidence bounds evaluation. % Default 0.95 (95%) % - 'FontSize' -> Font size for axis. Default 22 % - 'LineWidth' -> line width. Default 2 % - 'axis' -> set axis properties of the plot. refer to help axis for % further details % % Luigi Ferraioli 11-02-2011 % % % $Id: qqplot.m,v 1.8 2011/07/08 10:26:45 luigi Exp $ %%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% function h = qqplot(y1,y2,ops) %%% check and set imput options % Default input struct defaultparams = struct(... 'ProbDist','Fdist',... 'ShapeParam',1,... 'params',[1 1],... 'conflevel',0.95,... 'FontSize',22,... 'LineWidth',2,... 'axis',[]); names = {'ProbDist','ShapeParam','params','conflevel','FontSize','LineWidth','axis'}; % collecting input and default params if nargin == 3 if ~isempty(ops) for jj=1:length(names) if isfield(ops, names(jj)) defaultparams.(names{1,jj}) = ops.(names{1,jj}); end end end end pdist = defaultparams.ProbDist; % check theoretical distribution shp = defaultparams.ShapeParam; dof = defaultparams.params; % distribution parameters conf = defaultparams.conflevel; % confidence level for confidence bounds calculation if conf>1 conf = conf/100; end fontsize = defaultparams.FontSize; lwidth = defaultparams.LineWidth; axvect = defaultparams.axis; %%% check data input if isempty(y2) % do theoretical comparison % get empirical distribution for input data [eCD,ex]=utils.math.ecdf(y1); % switch between input theoretical distributions switch lower(pdist) case 'fdist' % get theoretical Quantile corresponding to empirical probabilities tx = utils.math.Finv(eCD,dof(1),dof(2)); CD = utils.math.Fcdf(ex,dof(1),dof(2)); case 'normdist' tx = utils.math.Norminv(eCD,dof(1),dof(2)); CD = utils.math.Normcdf(ex,dof(1),dof(2)); case 'chi2dist' tx = utils.math.Chi2inv(eCD,dof(1)); CD = utils.math.Chi2cdf(ex,dof(1)); case 'gammadist' tx = gammaincinv(eCD,dof(1)).*dof(2); CD = gammainc(ex./dof(2),dof(1)); end % get confidence levels with Kolmogorow - Smirnov test alp = (1-conf)/2; cVal = utils.math.SKcriticalvalues(numel(ex)*shp,[],alp); % get upper and lower bounds for x CDu = CD+cVal; CDl = CD-cVal; xup = interp1(CDl,ex,eCD); xlw = interp1(CDu,ex,eCD); figure h1 = plot(tx,ex); grid on hold on lnx = [min(tx) max(tx(1:end-1))]; lny = [min(tx) max(tx(1:end-1))]; h2 = line(lnx,lny,'Color','k'); h3 = plot(tx,xup,'b--'); h4 = plot(tx,xlw,'b--'); xlabel('Theoretical Quantile','FontSize',fontsize); ylabel('Sample Quantile','FontSize',fontsize); set(h1(1), 'Color','r', 'LineStyle','-','LineWidth',lwidth); set(h2(1), 'Color','k', 'LineStyle','--','LineWidth',lwidth); set(h3(1), 'Color','b', 'LineStyle',':','LineWidth',lwidth); set(h4(1), 'Color','b', 'LineStyle',':','LineWidth',lwidth); legend([h1(1),h2(1),h3(1)],{'Sample Quantile','Reference','Conf. Bounds'},'Location','SouthEast') if ~isempty(axvect) axis(axvect); else % get limit for quantiles corresponding to 0 and 0.99 prob xlw = interp1(CD,tx,0.001,'linear'); if isnan(xlw) xlw = min(CD); end xup = interp1(CD,tx,0.999,'linear'); % get limit for quantiles corresponding to 0 and 0.99 prob ylw = interp1(eCD,ex,0.001,'linear'); if isnan(ylw) ylw = min(eCD); end yup = interp1(eCD,ex,0.999,'linear'); axis([xlw xup ylw yup]); end h = [h1;h2;h3;h4]; else % do empirical comparison % get empirical distribution for input data [eCD1,ex1]=utils.math.ecdf(y1); [eCD2,ex2]=utils.math.ecdf(y2); % get confidence levels with Kolmogorow - Smirnov test alp = (1-conf)/2; cVal = utils.math.SKcriticalvalues(numel(ex1),numel(ex2),alp); % get confidence levels CDu = eCD2+cVal; CDl = eCD2-cVal; % get Quantile corresponding for second distribution to first empirical % probabilities tx = interp1(eCD2,ex2,eCD1); % get upper and lower bounds for x xup = interp1(CDl,ex2,eCD1); xlw = interp1(CDu,ex2,eCD1); figure h1 = plot(tx,ex1); grid on hold on lnx = [min(tx) max(tx(1:end-1))]; lny = [min(tx) max(tx(1:end-1))]; h2 = line(lnx,lny,'Color','k'); h3 = plot(tx,xup,'b--'); h4 = plot(tx,xlw,'b--'); xlabel('Y2 Quantile','FontSize',fontsize); ylabel('Y1 Quantile','FontSize',fontsize); set(h1(1), 'Color','r', 'LineStyle','-','LineWidth',lwidth); set(h2(1), 'Color','k', 'LineStyle','--','LineWidth',lwidth); set(h3(1), 'Color','b', 'LineStyle',':','LineWidth',lwidth); set(h4(1), 'Color','b', 'LineStyle',':','LineWidth',lwidth); legend([h1(1),h2(1),h3(1)],{'Sample Quantile','Reference','Conf. Bounds'},'Location','SouthEast') if ~isempty(axvect) axis(axvect); else % get limit for quantiles corresponding to 0 and 0.99 prob xlw = interp1(eCD2,ex2,0.001,'linear'); if isnan(xlw) xlw = min(eCD2); end xup = interp1(eCD2,ex2,0.999,'linear'); % get limit for quantiles corresponding to 0 and 0.99 prob ylw = interp1(eCD1,ex1,0.001,'linear'); if isnan(ylw) ylw = min(eCD1); end yup = interp1(eCD1,ex1,0.999,'linear'); axis([xlw xup ylw yup]); end h = [h1;h2;h3;h4]; end end