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randomly generated non-intersecting ellipses

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Tyler
Tyler el 15 de Dic. de 2013
Respondida: Sean de Wolski el 16 de Dic. de 2013
Hi all,
i need to generate randomly distributed ellipses within square bounds that are non-intersecting
generating the random points is easy, and creating ellipses is simple enough (likely will involve local and global coordinate systems),
But ensuring that the ellipses do not intersect is a challenge.
Is anyone aware of a pre-existing matlab code to check whether ellipses intersect or not?
Or alternatively, does anyone have a recommendation as to how to approach this problem?
Any help would be greatly appreciated
thanks!

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Matt J
Matt J el 15 de Dic. de 2013
Editada: Matt J el 15 de Dic. de 2013
You could randomly cut up the region into rectangular tiles.
Tiles=true(M,N);
Tiles(randi(M,mtiles,1),:)=false;
Tiles(:,randi(N,ntiles,1))=false;
S=regionprops(Tiles,'BoundingBox');
Then inscribe the tiles with ellipses.
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Matt J
Matt J el 15 de Dic. de 2013
Editada: Matt J el 15 de Dic. de 2013
however i nglected to mention that these ellipses can be on an angle as well.
As Image Analyst says, this in itself is not a limitation of what I proposed.
Perhaps what you really meant, however, is that you don't want to require the ellipses to be separable by horizontal/vertical lines.
If so, a related idea is to choose a random set of scattered (x,y) points in the field of the image. Then use voronoin() or delaunayn() to cut the field up into non-rectangular cells. Then inscribe ellipses into these. It would be a bit harder to incribe ellipses into polygons/triangles as opposed to rectangles, but still doable.
Matt J
Matt J el 16 de Dic. de 2013
Editada: Matt J el 16 de Dic. de 2013
It would be a bit harder to incribe ellipses into polygons/triangles as opposed to rectangles, but still doable.
This File Exchange tool
http://www.mathworks.com/matlabcentral/fileexchange/34767-a-suite-of-minimal-bounding-objects
would possibly be of help. Using incircle, you can inscribe the voronoi polygons or Delaunay triangles with circles. You can then shrink the circle by a random amount along some axis to obtain an inscribing ellipse.

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Sean de Wolski
Sean de Wolski el 16 de Dic. de 2013

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