how to order vertices in a non-convex polygon (how to find one of many solutions)

I have the same problem as here: how to order vertices in a simple, non-convex polygon but there is no solutions I can use.

I have coordinates of points and need to find some polygon. Does not matter that there is more solutions for one list of dots. I need some algorithm to find one of them. Does not matter which one. I really don't know how to solve this.

(I have stored coordinates in array and I want to use some algorithm in Javascript)

Thanks a lot.

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Perhaps if you tell us what is wrong with the solutions to the question your refer to which makes them unsuitable for your use we can provide accurate and useful assistance. If you can't, or don't, tell us, we may conclude that you do not have even a minimal understanding of the problem and rule your question off-topic for that reason. –  High Performance Mark Oct 31 '13 at 17:45
Are you restricted to simple polygons? Otherwise you can connect the vertices as you wish. They will always form a polygon. –  Nico Schertler Oct 31 '13 at 18:27
There is an O(n^2) algorithm: for every permutation of the points, construct a polygon and see if it's a simple non-convex polygon. Granted, this will take some time if you have a lot of points. How many points do you have? –  Jim Mischel Oct 31 '13 at 18:37
Thanks for comments. Answer below is appropriate for me and it describes my situation so it is solved. –  1daemon1 Nov 1 '13 at 17:43
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1 Answer

First, find the center of the bounding box that contains all of your vertices. We'll call this point C.

Sort your list of vertices based on each point's angle with respect to C. You can use `atan2``(point.y - C.y, point.x - C.x)` to find the angle. If two or more vertices have the same angle, the one closer to C should come first.

Then, draw your points in the order they appear in the list. You will end up with a starburst pattern that is non-intersecting and probably non-convex. Example:

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This is exactly what I need. Thanks a lot! –  1daemon1 Nov 1 '13 at 17:41
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