Boundary function fails, R2016b

Question

Jukka Koskinen am 1 Dez. 2016

0
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https://de.mathworks.com/matlabcentral/answers/314918-boundary-function-fails-r2016b

Kommentiert: Jukka Koskinen am 12 Dez. 2016

shape boundary.pdf

I try to make a concave hull type boundary around several overlapping shapes (four circles in this case) by the boundary function. The following code illustrates the problem. The boundary is drawn in black color (better seen in attached file). It doesn't look good... It seems that there is a bug in the function?

if true
clear all;
close all;
r_1 = 5;
r_2 = 3;
r_3 = 2;
r_4 = 2;
center_1 = [2 2];
center_2 = [2 -2];
center_3 = [5 5];
center_4 = [-3 5];
alpha = 0:(2*pi)/120:2*pi;
circle_1 = [center_1(1)+r_1*sin(alpha)' center_1(2)+r_1*cos(alpha)'];
circle_2 = [center_2(1)+r_2*sin(alpha)' center_2(2)+r_2*cos(alpha)'];
circle_3 = [center_3(1)+r_3*sin(alpha)' center_3(2)+r_3*cos(alpha)'];
circle_4 = [center_4(1)+r_4*sin(alpha)' center_4(2)+r_4*cos(alpha)'];
shape = [circle_1
       circle_2
       circle_3
       circle_4];
k = boundary(shape(:,2), shape(:,1), 1);
figure(1)
plot(circle_1(:,1), circle_1(:,2), 'r')
hold on;
grid on;
plot(circle_2(:,1), circle_2(:,2), 'b')
plot(circle_3(:,1), circle_3(:,2), 'g')
plot(circle_4(:,1), circle_4(:,2), 'm')
plot(shape(k,1), shape(k,2), 'k')
axis([-10 10 -10 10])
end

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Jukka Koskinen am 2 Dez. 2016

Bearbeitet: Jukka Koskinen am 2 Dez. 2016

The function works fine, when I move circle_4 center one step to the right (coordinates [-2,5]). But when coordinates are [-3,5] the function doesn't work properly, as seen above.

It should look like this:

Adam am 2 Dez. 2016

Ah, ok, I kind of just ignored the inner black lines thinking they wee just part of the things being bounded.

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Answer 1

Massimo Zanetti am 7 Dez. 2016

1
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Direkter Link zu dieser Antwort

https://de.mathworks.com/matlabcentral/answers/314918-boundary-function-fails-r2016b#answer_246354

Hi Jukka, if you look at the plot of the boundary without superimposing it to the circles you can see (see first image below) that the shrinking is extreme. You set it to the maximum value of 1 with k = boundary(shape(:,2), shape(:,1), 1);. Thus, the algorithm finds points also in the interior of the major circle.

To solve for this, just relax the shrinking factor by setting it to .5 (the default value). So, invoke k = boundary(shape(:,2), shape(:,1), .5);. The result is shown in the second image. I think that is the one you need. :)