File:NonConvex.gif
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外观
NonConvex.gif (360 × 392像素,文件大小:782 KB,MIME类型:image/gif、循环、84帧、4.2秒)
The weighted-sum approach minimizes function
where
such that
To have a non-convex outcome set, parameters and are set to the following values
Weights and are such that
摘要
描述NonConvex.gif |
English: Weighted-sum approach is an easy method used to solve multi-objective optimization problem. It consists in aggregating the different optimization functions in a single function. However, this method only allows to find the supported solutions of the problem (i.e. points on the convex hull of the objective set). This animation shows that when the outcome set is not convex, not all efficient solutions can be found
Français : La méthode des sommes pondérées est une méthode simple pour résoudre des problèmes d'optimisation multi-objectif. Elle consiste à aggréger l'ensemble des fonctions dans une seule fonction avec différents poids. Toutefois, cette méthode permet uniquement de trouver les solutions supportées (càd les points non-dominés appartenant à l'enveloppe convexe de l'espace d'arrivée). Cette animation montre qu'il n'est pas possible d'identifier toutes les solutions efficaces lorsque l'espace d'arrivée est n'est pas convexe. |
日期 | |
来源 | 自己的作品 |
作者 | Guillaume Jacquenot |
Source code (MATLAB)
function MO_Animate(varargin)
% This function generates objective space images showing why
% sum-weighted optimizer can not find all non-dominated
% solutions for non convex objective spaces in multi-ojective
% optimization
%
% Guillaume JACQUENOT
if nargin == 0
% Simu = 'Convex';
Simu = 'NonConvex';
save_pictures = true;
interpreter = 'none';
end
switch Simu
case 'NonConvex'
a = 0.1;
b = 3;
stepX = 1/200;
stepY = 1/200;
case 'Convex'
a = 0.2;
b = 1;
stepX = 1/200;
stepY = 1/200;
end
[X,Y] = meshgrid( 0:stepX:1,-2:stepY:2);
F1 = X;
F2 = 1+Y.^2-X-a*sin(b*pi*X);
figure;
grid on;
hold on;
box on;
axis square;
set(gca,'xtick',0:0.2:1);
set(gca,'ytick',0:0.2:1);
Ttr = get(gca,'XTickLabel');
Ttr(1,:)='0.0';
Ttr(end,:)='1.0';
set(gca,'XTickLabel',[repmat(' ',size(Ttr,1),1) Ttr]);
Ttr = get(gca,'YTickLabel');
Ttr(1,:)='0.0';
Ttr(end,:)='1.0';
set(gca,'YTickLabel',[repmat(' ',size(Ttr,1),1) Ttr]);
if strcmp(interpreter,'none')
xlabel('f1','Interpreter','none');
ylabel('f2','Interpreter','none','rotation',0);
else
xlabel('f_1','Interpreter','Tex');
ylabel('f_2','Interpreter','Tex','rotation',0);
end
set(gcf,'Units','centimeters')
set(gcf,'OuterPosition',[3 3 3+6 3+6])
set(gcf,'PaperPositionMode','auto')
[minF2,minF2_index] = min(F2);
minF2_index = minF2_index + (0:numel(minF2_index)-1)*size(X,1);
O1 = F1(minF2_index)';
O2 = minF2';
[pF,Pareto]=prtp([O1,O2]);
fill([O1( Pareto);1],[O2( Pareto);1],repmat(0.95,1,3));
text(0.45,0.75,'Objective space');
text(0.1,0.9,'\leftarrow Optimal Pareto front','Interpreter','TeX');
plot(O1( Pareto),O2( Pareto),'k-','LineWidth',2);
plot(O1(~Pareto),O2(~Pareto),'.','color',[1 1 1]*0.8);
V1 = O1( Pareto); V1 = V1(end:-1:1);
V2 = O2( Pareto); V2 = V2(end:-1:1);
O1P = O1( Pareto);
O2P = O2( Pareto);
O1PC = [O1P;max(O1P)];
O2PC = [O2P;max(O2P)];
ConvH = convhull(O1PC,O2PC);
ConvH(ConvH==numel(O2PC))=[];
c = setdiff(1:numel(O1P), ConvH);
% Non convex
O1PNC = O1PC(c);
[temp, I1] = min(O1PNC);
[temp, I2] = max(O1PNC);
if ~isempty(I1) && ~isempty(I2)
plot(O1PC(c),O2PC(c),'-','color',[1 1 1]*0.7,'LineWidth',2);
end
p1 = (V2(1)-V2(2))/(V1(1)-V1(2));
hp = plot([0 1],[p1*(-V1(1))+V2(1) p1*(1-V1(1))+V2(1)]);
delete(hp);
Histo_X = [];
Histo_Y = [];
coeff = 0.02;
Sq1 = coeff *[0 1 1 0 0;0 0 1 1 0];
compt = 1;
for i = 2:1:length(V1)-1
if ismember(i,ConvH)
p1 = (V2(i+1)-V2(i-1))/(V1(i+1)-V1(i-1));
x_inter = 1/(1+p1^2)*(p1^2*V1(i)-p1*V2(i));
hp1 = plot([0 1],[p1*(-V1(i))+V2(i) p1*(1-V1(i))+V2(i)],'k');
% hp2 = plot([x_inter],[-x_inter/p1],'k','Marker','.','MarkerSize',8)
hp3 = plot([0 x_inter],[0 -x_inter/p1],'k-');
hp4 = plot([x_inter 1],[-x_inter/p1 -1/p1],'k--');
hp5 = plot(V1(i),V2(i),'ko','MarkerSize',10);
% Plot the square for perpendicular lines
alpha = atan(-1/p1);
Mrot = [cos(alpha) -sin(alpha);sin(alpha) cos(alpha)];
Sq_plot = repmat([x_inter;-x_inter/p1],1,5) + Mrot * Sq1;
hp7 = plot(Sq_plot(1,:),Sq_plot(2,:),'k-');
Histo_X = [Histo_X V1(i)];
Histo_Y = [Histo_Y V2(i)];
hp6 = plot(Histo_X,Histo_Y,'k.','MarkerSize',10);
w1 = p1/(p1-1);
w2 = 1-w1;
Fweight_sum = V1(i)*w1+w2*V2(i);
Fweight_sum = floor(1e3*Fweight_sum )/1e3;
w1 = floor(1000*w1)/1e3;
str1 = sprintf('%.3f',w1);
str2 = sprintf('%.3f',1-w1);
str3 = sprintf('%.3f',Fweight_sum);
if (strcmp(str1,'0.500')||strcmp(str1,'0,500')) && strcmp(Simu,'NonConvex')
disp('Two solutions');
end
title(['\omega_1 = ' str1 ' & \omega_2 = ' str2 ' & F = ' str3],'Interpreter','TeX');
axis([0 1 0 1]);
file = ['Frame' num2str(1000+compt)];
if save_pictures
saveas(gcf, file, 'epsc');
end
compt = compt +1;
pause(0.001);
delete(hp1);
delete(hp3);
delete(hp4);
delete(hp5);
delete(hp6);
delete(hp7);
end
end
disp(['Number of frames :' num2str(length(V1))]);
return;
function [A varargout]=prtp(B)
% Let Fi(X), i=1...n, are objective functions
% for minimization.
% A point X* is said to be Pareto optimal one
% if there is no X such that Fi(X)<=Fi(X*) for
% all i=1...n, with at least one strict inequality.
% A=prtp(B),
% B - m x n input matrix: B=
% [F1(X1) F2(X1) ... Fn(X1);
% F1(X2) F2(X2) ... Fn(X2);
% .......................
% F1(Xm) F2(Xm) ... Fn(Xm)]
% A - an output matrix with rows which are Pareto
% points (rows) of input matrix B.
% [A,b]=prtp(B). b is a vector which contains serial
% numbers of matrix B Pareto points (rows).
% Example.
% B=[0 1 2; 1 2 3; 3 2 1; 4 0 2; 2 2 1;...
% 1 1 2; 2 1 1; 0 2 2];
% [A b]=prtp(B)
% A =
% 0 1 2
% 4 0 2
% 2 2 1
% b =
% 1 4 7
A=[]; varargout{1}=[];
sz1=size(B,1);
jj=0; kk(sz1)=0;
c(sz1,size(B,2))=0;
bb=c;
for k=1:sz1
j=0;
ak=B(k,:);
for i=1:sz1
if i~=k
j=j+1;
bb(j,:)=ak-B(i,:);
end
end
if any(bb(1:j,:)'<0)
jj=jj+1;
c(jj,:)=ak;
kk(jj)=k;
end
end
if jj
A=c(1:jj,:);
varargout{1}=kk(1:jj);
else
warning([mfilename ':w0'],...
'There are no Pareto points. The result is an empty matrix.')
end
return;
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当前 | 2009年3月8日 (日) 17:13 | 360 × 392(782 KB) | Gjacquenot | {{Information |Description={{en|1=Weighted-sum approach is an easy method used to solve multi-objective optimization problem. It consists in aggregating the different optimization functions in a single function. However, this method only allows to find th |
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