How can I choose a subset of k points the farthest apart?

9 次查看(过去 30 天)
I have a set of n points.
Among these points, I wish to select the k points the "farthest apart" among the n points (in order to maximize the spatial representativity of the k points). And I want to try this with different values of k. (n is around 14, and I would then vary k for e.g. 2 to n in order to compare different cases)
Does any one has an idea about an efficient way to proceed?
(oh, and I am in a 2-D case)
  2 个评论
Jonas
Jonas 2012-7-3
编辑:Jonas 2012-7-3
an example of dataset would be:
Peaks_Ref=[98 1547; 641 1108 ; 124 476 ; 508 507 ; 619 512 ; 746 531 ; 342 507 ; 439 1018 ; 195 1099 ; 550 843; 721 1651; 384 1547; 305 2364 ; 175 1649 ; ]; % (x,y) position, each line describing a point
and then take e.g. the 6 points which maximize the distance between all of them...

请先登录,再进行评论。

回答(6 个)

Image Analyst
Image Analyst 2012-7-3
编辑:Image Analyst 2012-7-3
Did you look at the convex hull? MATLAB has a function convhull(). The points farthest apart will be on the convex hull.
If you have more points that you want than are on the convex hull, you'll have to consider interior points. For example if you have 3 points on the vertex of the triangle and a cluster of points interior to them, the convex hull is the triangle. But if you want the 5 pairs that are farthest from each other, the convex hull can give you only 3 so to get the other 2 you need, you'd probably have to do an exhaustive search finding the distance of every point to every other point and then sort. Fortunately if you have only a handful of points like you do, then this should not take very long.
  1 个评论
Thomas
Thomas 2012-7-3
BAsed on Image analysts answer and your clarifications
Peaks_Ref=[ 98 1547; % (x,y) position
641 1108 ; 124 476 ; 508 507 ; 619 512 ; 746 531 ; 342 507 ; 439 1018 ; 195 1099 ; 550 843; 721 1651; 384 1547; 305 2364 ; 175 1649 ; ];
plot(Peaks_Ref(:,1),Peaks_Ref(:,2),'Marker','x','LineStyle','none')
out=convhull(Peaks_Ref);
extremes=Peaks_Ref(out,:);
hold on
plot(extremes(:,1),extremes(:,2),'Marker','o','LineStyle','none','Color','g','MarkerSize',6,'MarkerFaceColor',[0 0.498039215803146 0])

请先登录,再进行评论。


Jonas
Jonas 2012-7-3
编辑:Jonas 2012-7-3
In fact I want to maximize the total interpoint distance (something like the total distance of all the edges of a Delaunay Triangulation (or maybe more simply just the total sum of the distances between all the points)). But I want to avoid the convex hull, because then points are only selected on the edges leaving a hole in the center (I want to have points chosen well spread in my plane (i.e. also in the center if better))

Dr. Seis
Dr. Seis 2012-7-3
编辑:Dr. Seis 2012-7-3
Went with a "simple" way - tried to maximize the sum of the distances between each point in the sub-set of "n" below (similar to way you described earlier):
n = randn(14,2);
k = 7;
b = nchoosek(1:length(n),k);
c = zeros(size(b,1),1);
for i = 1 : size(b,1)
subb = b(i,:);
subn = n(subb,:);
for j = 1 : size(b,2)-1
for k = j+1 : size(b,2)
c(i) = c(i) + sqrt((subn(j,1)-subn(k,1))^2 + ...
(subn(j,2)-subn(k,2))^2);
end
end
end
[d,e] = max(c);
f = b(e,:);
%figure
plot(n(:,1),n(:,2),'bo',n(f,1),n(f,2),'rx');
legend('Point Set',sprintf('"Best" %d Points',k));

Jonas
Jonas 2012-7-3
Elige Grant, your solution is very interesting, but it has the tendency to chose points on the exterior of the set of points, even if they are close one to the others. (e.g. in the figure you show, among the points selected in the top left corner, I would have expected the point in the middle not to be seleceted, but instead to have a point selected somewhere in the middle). So maybe just direct total sum of all the distances is not enough, a selection of distances like using a Delaunay triangulation might be better...

Jonas
Jonas 2012-7-5
编辑:Jonas 2012-7-5
Based on Elige Grant's solution, I tried another solution using the Delaunay triangulation. It seems a bit better. (changing max_dist_crit to 1 and delny_tri_crit and max_mindist_crit to 0 allows to see Elige Grant's solution: points are selected from the outside to the inside, not the behaviour that I desired). But it was still not perfect. I like the solution below: maximizing the sum of minimum distance to the closest point for each point.
MATLAB code
% IF MAX LENGTH OF SEGMENTS OF DELAUNAY TRIANGULATION CRITERION:
delny_tri_crit=0;
% IF MAX OF ALL DISTANCES BETWEEN ALL POINTS WITHIN THE CHROMATOGRAM:
max_dist_crit=0;
% IF MAX LENGTH OF SEGMENTS OF DELAUNAY TRIANGULATION CRITERION, with
% double count of distances on the edge of the convex hull. Doesn't really
% work, even with other criteria than *2...
delny_tri_crit2=0;
% IF MAX OF the minimum DISTANCE to a neighboring peak for each alignment
% point:
max_mindist_crit=1;
Peaks_Ref=[ 98 1547; % (x,y) position
641 1108 ; 124 476 ; 508 507 ; 619 512 ; 746 531 ; 342 507 ; 439 1018 ; 195 1099 ; 550 843; 721 1651; 384 1547; 305 2364 ; 175 1649 ; ];
%TRI = delaunay(X,Y)
n = Peaks_Ref;
isfirst=true;
for k=3:size(Peaks_Ref,1)-1
%k = 11;
b = nchoosek(1:length(n),k);
c = zeros(size(b,1),1);
if max_mindist_crit
c=c+1e99;
end
for i = 1 : size(b,1)
subb = b(i,:);
subn = n(subb,:);
if or(delny_tri_crit,delny_tri_crit2)
TRI = delaunay(subn(:,1),subn(:,2));
for ka=1:size(TRI,1)
for k2=1:3
c(i)=c(i)+sqrt(((subn(TRI(ka,k2),1)-subn(TRI(ka,mod(k2,3)+1),1))^2)+((subn(TRI(ka,k2),2)-subn(TRI(ka,mod(k2,3)+1),2))^2));
end
end
CVHL=convhull(subn(:,1),subn(:,2));
for kx=1:length(CVHL)-1
if delny_tri_crit
c(i)=c(i)+sqrt(((subn(CVHL(kx),1)-subn(CVHL(kx+1),1))^2)+((subn(CVHL(kx),2)-subn(CVHL(kx+1),2))^2));
elseif delny_tri_crit2
c(i)=c(i)+3*sqrt(((subn(CVHL(kx),1)-subn(CVHL(kx+1),1))^2)+((subn(CVHL(kx),2)-subn(CVHL(kx+1),2))^2));
end
end
elseif max_dist_crit
for j = 1 : size(b,2)-1
for ka = j+1 : size(b,2)
c(i) = c(i) + sqrt((subn(j,1)-subn(ka,1))^2 + ...
(subn(j,2)-subn(ka,2))^2);
end
end
elseif max_mindist_crit
for j = 1 : size(b,2)-1
for ka = j+1 : size(b,2)
c(i) = min(c(i),sqrt((subn(j,1)-subn(ka,1))^2 + ...
(subn(j,2)-subn(ka,2))^2));
end
end
end
end
[d,e] = max(c);
f = b(e,:);
figure
plot(n(:,1),n(:,2),'bo',n(f,1),n(f,2),'rx');
legend('Point Set',sprintf('"Best" %d Points',k))
%on ajoute l'image à la fin de notre gif
F = getframe(gcf); %on récupère l'image
[RGB,badmap] = frame2im(F); %on la convertit en image de type 'true-color'
[IND,map] = rgb2ind(RGB, 255); %on convertit en couleur indéxées. 255 est le nombre de couleur.
if isfirst
if delny_tri_crit
imwrite(IND,map,'FarthestAlPtsDelaunay.gif','gif'); %c'est la première image: on crée le fichier
elseif max_dist_crit
imwrite(IND,map,'FarthestAlPtsMaxDist.gif','gif'); %c'est la première image: on crée le fichier
elseif delny_tri_crit2
imwrite(IND,map,'FarthestAlPtsDelaunay2.gif','gif'); %c'est la première image: on crée le fichier
elseif max_mindist_crit
imwrite(IND,map,'FarthestAlPtsMaxMin.gif','gif'); %c'est la première image: on crée le fichier
end
isfirst=false;
else
%%%%%imwrite(IND,map,'example.gif','gif','WriteMode','append'); %ce sont les suivantes: on les ajoute
if delny_tri_crit
imwrite(IND,map,'FarthestAlPtsDelaunay.gif','gif','WriteMode','append','DelayTime',1);
elseif max_dist_crit
imwrite(IND,map,'FarthestAlPtsMaxDist.gif','gif','WriteMode','append','DelayTime',1);
elseif delny_tri_crit2
imwrite(IND,map,'FarthestAlPtsDelaunay2.gif','gif','WriteMode','append','DelayTime',1);
elseif max_mindist_crit
imwrite(IND,map,'FarthestAlPtsMaxMin.gif','gif','WriteMode','append','DelayTime',1);
end
end
close
end

Dr. Seis
Dr. Seis 2012-7-5
编辑:Dr. Seis 2012-7-5
Added a few more tests (including your latest) and added your data (instead of just random dataset), which may be of interest. Relevant code:
n = [ 98 1547; 641 1108 ; 124 476 ; 508 507 ; 619 512 ; 746 531 ; 342 507 ; 439 1018 ; 195 1099 ; 550 843; 721 1651; 384 1547; 305 2364 ; 175 1649]
k = 7;
b = nchoosek(1:length(n),k);
c1 = zeros(size(b,1),1);
c2 = zeros(size(b,1),1);
c3 = zeros(size(b,1),1);
c4 = zeros(size(b,1),1);
c5 = zeros(size(b,1),1);
for i = 1 : size(b,1)
subb = b(i,:);
subn = n(subb,:);
subd = delaunay(subn(:,1),subn(:,2));
% Method 1 (Sum of distances between each pair in points sub-set)
for j = 1 : size(b,2)-1
for k = j+1 : size(b,2)
c1(i) = c1(i) + sqrt((subn(j,1)-subn(k,1))^2 + ...
(subn(j,2)-subn(k,2))^2);
end
end
% Method 2 (Sum of Delaunay triangle perimeter, squared)
for j = 1 : size(subd,1)
c2(i) = c2(i) + ...
( sqrt((subn(subd(j,1),1)-subn(subd(j,2),1))^2 ...
+ (subn(subd(j,1),2)-subn(subd(j,2),2))^2) ...
+ sqrt((subn(subd(j,3),1)-subn(subd(j,2),1))^2 ...
+ (subn(subd(j,3),2)-subn(subd(j,2),2))^2) ...
+ sqrt((subn(subd(j,1),1)-subn(subd(j,3),1))^2 ...
+ (subn(subd(j,1),2)-subn(subd(j,3),2))^2) )^2;
end
% Method 3 (Sum of Delaunay triangle area)
for j = 1 : size(subd,1)
c3(i) = c3(i) + polyarea(subn(subd(j,:),1),subn(subd(j,:),2));
end
% Method 5 (Delaunay + Convhull)
for ka=1:size(subd,1)
for k2=1:3
c5(i)= c5(i) + ...
sqrt(((subn(subd(ka,k2),1)-subn(subd(ka,mod(k2,3)+1),1))^2)+...
((subn(subd(ka,k2),2)-subn(subd(ka,mod(k2,3)+1),2))^2));
end
end
CVHL=convhull(subn(:,1),subn(:,2));
for kx=1:length(CVHL)-1
c5(i)=c5(i) + ...
sqrt(((subn(CVHL(kx),1)-subn(CVHL(kx+1),1))^2)+...
((subn(CVHL(kx),2)-subn(CVHL(kx+1),2))^2));
end
end
% Method 4 (Method 2 and Method 3)
c4 = c2/max(c2) + c3/max(c3);
[~,e1] = max(c1);
[~,e2] = max(c2);
[~,e3] = max(c3);
[~,e4] = max(c4);
[~,e5] = max(c5);
f1 = b(e1,:);
f2 = b(e2,:);
f3 = b(e3,:);
f4 = b(e4,:);
f5 = b(e5,:);
figure;
subplot(2,3,1);
plot(n( :,1),n(: ,2),'bo','MarkerSize',15);
title('Starting Point Set'); axis equal;
subplot(2,3,2);
plot(n( :,1),n(: ,2),'bo','MarkerSize',15); hold on;
plot(n(f1,1),n(f1,2),'rx','MarkerSize',15); hold off;
title(sprintf('"Best" %d Points (M-1)',k)); axis equal;
subplot(2,3,3);
plot(n( :,1),n(: ,2),'bo','MarkerSize',15); hold on;
plot(n(f2,1),n(f2,2),'rx','MarkerSize',15); hold off;
title(sprintf('"Best" %d Points (M-2)',k)); axis equal;
subplot(2,3,4);
plot(n( :,1),n(: ,2),'bo','MarkerSize',15); hold on;
plot(n(f3,1),n(f3,2),'rx','MarkerSize',15); hold off;
title(sprintf('"Best" %d Points (M-3)',k)); axis equal;
subplot(2,3,5);
plot(n( :,1),n(: ,2),'bo','MarkerSize',15); hold on;
plot(n(f4,1),n(f4,2),'rx','MarkerSize',15); hold off;
title(sprintf('"Best" %d Points (M-4)',k)); axis equal;
subplot(2,3,6);
plot(n( :,1),n(: ,2),'bo','MarkerSize',15); hold on;
plot(n(f5,1),n(f5,2),'rx','MarkerSize',15); hold off;
title(sprintf('"Best" %d Points (M-5)',k)); axis equal;
  2 个评论
Jonas
Jonas 2012-7-6
编辑:Jonas 2012-7-6
I really don't understand... When I try to add my very last method (maximum of minimum distance) to your new version is doesn't give me the same result as previously... But it made me realize that this method is not that good, as it maximizes only the minimum distance between the two closest points (therefore there are more than one optimal solution, and the choice of a solution with this version was arbitrary...). I was believing that I was taking the minimum distances to the closest point for each point, but it is not the case...
MATLAB code
close all
isfirst=true;
n = [ 98 1547; 641 1108 ; 124 476 ; 508 507 ; 619 512 ; 746 531 ; 342 507 ; 439 1018 ; 195 1099 ; 550 843; 721 1651; 384 1547; 305 2364 ; 175 1649];
for k=3:size(n,1)-1
b = nchoosek(1:length(n),k);
c1 = zeros(size(b,1),1);
c2 = zeros(size(b,1),1);
c3 = zeros(size(b,1),1);
c4 = zeros(size(b,1),1);
c5 = zeros(size(b,1),1);
c6 = ones(size(b,1),1)*1e197;
for i = 1 : size(b,1)
subb = b(i,:);
subn = n(subb,:);
subd = delaunay(subn(:,1),subn(:,2));
% Method 1 (Sum of distances between each pair in points sub-set)
for j = 1 : size(b,2)-1
for k = j+1 : size(b,2)
c1(i) = c1(i) + sqrt((subn(j,1)-subn(k,1))^2 + ...
(subn(j,2)-subn(k,2))^2);
end
end
% Method 2 (Sum of Delaunay triangle perimeter, squared)
for j = 1 : size(subd,1)
c2(i) = c2(i) + ...
( sqrt((subn(subd(j,1),1)-subn(subd(j,2),1))^2 ...
+ (subn(subd(j,1),2)-subn(subd(j,2),2))^2) ...
+ sqrt((subn(subd(j,3),1)-subn(subd(j,2),1))^2 ...
+ (subn(subd(j,3),2)-subn(subd(j,2),2))^2) ...
+ sqrt((subn(subd(j,1),1)-subn(subd(j,3),1))^2 ...
+ (subn(subd(j,1),2)-subn(subd(j,3),2))^2) )^2;
end
% Method 3 (Sum of Delaunay triangle area)
for j = 1 : size(subd,1)
c3(i) = c3(i) + polyarea(subn(subd(j,:),1),subn(subd(j,:),2));
end
% Method 5 (Delaunay + Convhull)
for ka=1:size(subd,1)
for k2=1:3
c5(i)= c5(i) + ...
sqrt(((subn(subd(ka,k2),1)-subn(subd(ka,mod(k2,3)+1),1))^2)+...
((subn(subd(ka,k2),2)-subn(subd(ka,mod(k2,3)+1),2))^2));
end
end
CVHL=convhull(subn(:,1),subn(:,2));
for kx=1:length(CVHL)-1
c5(i)=c5(i) + ...
sqrt(((subn(CVHL(kx),1)-subn(CVHL(kx+1),1))^2)+...
((subn(CVHL(kx),2)-subn(CVHL(kx+1),2))^2));
end
end
% Method 4 (Method 2 and Method 3)
c4 = c2/max(c2) + c3/max(c3);
%%Method 6
for j = 1 : size(b,2)-1
for ka = j+1 : size(b,2)
c6(i) = min(c6(i),sqrt(((subn(j,1)-subn(ka,1))^2) + ...
((subn(j,2)-subn(ka,2))^2)));
end
end
[~,e1] = max(c1);
[~,e2] = max(c2);
[~,e3] = max(c3);
[~,e4] = max(c4);
[~,e5] = max(c5);
[d6,e6] = max(c6);
f1 = b(e1,:);
f2 = b(e2,:);
f3 = b(e3,:);
f4 = b(e4,:);
f5 = b(e5,:);
f6 = b(e6,:);
figure;
subplot(2,3,1);
plot(n( :,1),n(: ,2),'bo','MarkerSize',15); hold on;
plot(n(f6,1),n(f6,2),'rx','MarkerSize',15); hold off;
title(sprintf('"Best" %d Points (M-6)',k)); axis equal;
subplot(2,3,2);
plot(n( :,1),n(: ,2),'bo','MarkerSize',15); hold on;
plot(n(f1,1),n(f1,2),'rx','MarkerSize',15); hold off;
title(sprintf('"Best" %d Points (M-1)',k)); axis equal;
subplot(2,3,3);
plot(n( :,1),n(: ,2),'bo','MarkerSize',15); hold on;
plot(n(f2,1),n(f2,2),'rx','MarkerSize',15); hold off;
title(sprintf('"Best" %d Points (M-2)',k)); axis equal;
subplot(2,3,4);
plot(n( :,1),n(: ,2),'bo','MarkerSize',15); hold on;
plot(n(f3,1),n(f3,2),'rx','MarkerSize',15); hold off;
title(sprintf('"Best" %d Points (M-3)',k)); axis equal;
subplot(2,3,5);
plot(n( :,1),n(: ,2),'bo','MarkerSize',15); hold on;
plot(n(f4,1),n(f4,2),'rx','MarkerSize',15); hold off;
title(sprintf('"Best" %d Points (M-4)',k)); axis equal;
subplot(2,3,6);
plot(n( :,1),n(: ,2),'bo','MarkerSize',15); hold on;
plot(n(f5,1),n(f5,2),'rx','MarkerSize',15); hold off;
title(sprintf('"Best" %d Points (M-5)',k)); axis equal;
%on ajoute l'image à la fin de notre gif
F = getframe(gcf); %on récupère l'image
[RGB,badmap] = frame2im(F); %on la convertit en image de type 'true-color'
[IND,map] = rgb2ind(RGB, 255); %on convertit en couleur indéxées. 255 est le nombre de couleur.
if isfirst
imwrite(IND,map,'FarthestAlPtsELIGE2.gif','gif'); %c'est la première image: on crée le fichier
isfirst=false;
else
%%%%%imwrite(IND,map,'example.gif','gif','WriteMode','append'); %ce sont les suivantes: on les ajoute
imwrite(IND,map,'FarthestAlPtsELIGE2.gif','gif','WriteMode','append','DelayTime',1);
end
close
end
Jonas
Jonas 2012-7-6
And if I modify my previous version to do what I believe I was doing (i.e. the sum of the minimum distance to the closest point for each point), it gives quite satisfactory results...
MATLAB code
% IF MAX LENGTH OF SEGMENTS OF DELAUNAY TRIANGULATION CRITERION:
delny_tri_crit=0;
% IF MAX OF ALL DISTANCES BETWEEN ALL POINTS WITHIN THE CHROMATOGRAM:
max_dist_crit=0;
% IF MAX LENGTH OF SEGMENTS OF DELAUNAY TRIANGULATION CRITERION, with
% double count of distances on the edge of the convex hull. Doesn't really
% work, even with other criteria than *2...
delny_tri_crit2=0;
% IF MAX OF the minimum DISTANCE to a neighboring peak for each alignment
% point:
max_mindist_crit=1;
Peaks_Ref=[ 98 1547; % (x,y) position
641 1108 ; 124 476 ; 508 507 ; 619 512 ; 746 531 ; 342 507 ; 439 1018 ; 195 1099 ; 550 843; 721 1651; 384 1547; 305 2364 ; 175 1649 ; ];
%TRI = delaunay(X,Y)
n = Peaks_Ref;
isfirst=true;
for k=3:size(Peaks_Ref,1)-1
%k = 11;
b = nchoosek(1:length(n),k);
c = zeros(size(b,1),1);
if max_mindist_crit
% c=c+1e99;
end
for i = 1 : size(b,1)
subb = b(i,:);
subn = n(subb,:);
if or(delny_tri_crit,delny_tri_crit2)
TRI = delaunay(subn(:,1),subn(:,2));
for ka=1:size(TRI,1)
for k2=1:3
c(i)=c(i)+sqrt(((subn(TRI(ka,k2),1)-subn(TRI(ka,mod(k2,3)+1),1))^2)+((subn(TRI(ka,k2),2)-subn(TRI(ka,mod(k2,3)+1),2))^2));
end
end
CVHL=convhull(subn(:,1),subn(:,2));
for kx=1:length(CVHL)-1
if delny_tri_crit
c(i)=c(i)+sqrt(((subn(CVHL(kx),1)-subn(CVHL(kx+1),1))^2)+((subn(CVHL(kx),2)-subn(CVHL(kx+1),2))^2));
elseif delny_tri_crit2
c(i)=c(i)+3*sqrt(((subn(CVHL(kx),1)-subn(CVHL(kx+1),1))^2)+((subn(CVHL(kx),2)-subn(CVHL(kx+1),2))^2));
end
end
elseif max_dist_crit
for j = 1 : size(b,2)-1
for ka = j+1 : size(b,2)
c(i) = c(i) + sqrt((subn(j,1)-subn(ka,1))^2 + ...
(subn(j,2)-subn(ka,2))^2);
end
end
elseif max_mindist_crit
MaxMinD=ones(size(b,2))*1e197;
for j = 1 : size(b,2)
kr=1 : size(b,2);
kr=kr(kr~=j);
for ka=kr
MaxMinD(j)=min(MaxMinD(j),sqrt((subn(j,1)-subn(ka,1))^2 + ...
(subn(j,2)-subn(ka,2))^2));
end
c(i)=c(i)+MaxMinD(j);
end
% for j = 1 : size(b,2)-1
% for ka = j+1 : size(b,2)
% c(i) = min(c(i),sqrt((subn(j,1)-subn(ka,1))^2 + ...
% (subn(j,2)-subn(ka,2))^2));
% end
% end
end
end
[d,e] = max(c);
f = b(e,:);
figure
plot(n(:,1),n(:,2),'bo',n(f,1),n(f,2),'rx');
legend('Point Set',sprintf('"Best" %d Points',k))
%on ajoute l'image à la fin de notre gif
F = getframe(gcf); %on récupère l'image
[RGB,badmap] = frame2im(F); %on la convertit en image de type 'true-color'
[IND,map] = rgb2ind(RGB, 255); %on convertit en couleur indéxées. 255 est le nombre de couleur.
if isfirst
if delny_tri_crit
imwrite(IND,map,'FarthestAlPtsDelaunay.gif','gif'); %c'est la première image: on crée le fichier
elseif max_dist_crit
imwrite(IND,map,'FarthestAlPtsMaxDist.gif','gif'); %c'est la première image: on crée le fichier
elseif delny_tri_crit2
imwrite(IND,map,'FarthestAlPtsDelaunay2.gif','gif'); %c'est la première image: on crée le fichier
elseif max_mindist_crit
imwrite(IND,map,'FarthestAlPtsMaxMinT.gif','gif'); %c'est la première image: on crée le fichier
end
isfirst=false;
else
%%%%%imwrite(IND,map,'example.gif','gif','WriteMode','append'); %ce sont les suivantes: on les ajoute
if delny_tri_crit
imwrite(IND,map,'FarthestAlPtsDelaunay.gif','gif','WriteMode','append','DelayTime',1);
elseif max_dist_crit
imwrite(IND,map,'FarthestAlPtsMaxDist.gif','gif','WriteMode','append','DelayTime',1);
elseif delny_tri_crit2
imwrite(IND,map,'FarthestAlPtsDelaunay2.gif','gif','WriteMode','append','DelayTime',1);
elseif max_mindist_crit
imwrite(IND,map,'FarthestAlPtsMaxMinT.gif','gif','WriteMode','append','DelayTime',1);
end
end
close
end

请先登录,再进行评论。

类别

Help CenterFile Exchange 中查找有关 Delaunay Triangulation 的更多信息

Community Treasure Hunt

Find the treasures in MATLAB Central and discover how the community can help you!

Start Hunting!

Translated by