# How to partially cover a given shape with fixed number of circles?

I am not sure if it is proper to ask for help on algorithm here, but could anyone give me some guide, or just tell me where I could find such a kind of guide? Thanks a lot!

The problem is like this: given a fixed number of circles, I need an algorithm to find an optimal set of positions and radius of these circles to cover a given shape, so the error area (the parts of the circles outside the given shape + the parts of the shape not covered by these circles) is minimal? Circles could overlap.

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What kinds of shapes are these? Polygons? Pixels from an image? What? –  John Kugelman May 29 '13 at 3:34
Just arbitrarily shapes. –  hookch May 29 '13 at 3:48
Does each circle get its own radius? Or all the same radius? –  jwpat7 May 29 '13 at 4:30
Could get its own radius. –  hookch May 29 '13 at 13:50

This is not a trivial problem and there is certainly no simple analytic solution. For example: even the simplest version - one circle and one simple connected area isn't necessarily easy to solve depending on the shape of the area. There will also typically be numerous false minimums.

I would suggest that simulated annealing would be a suitable technique to find a good (if not the optimal) solution. Effectively, with n circles you are exploring a wildly varying function of 3n variables (x, y, and r for each circle) and simulated annealing is a fairly efficient way of exploring such an environment.

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