# How do I calculate a bounding polygon?

I have a cloud of 2D points and I would like to calculate the perimeter of a polygon which encompasses all of them.

Is there a name for this mathematical process which I can Google or can someone tell me how to start thinking about the problem, please?

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You're probably looking for the convex hull and for convex hull algorithms.

One of the simplest 2D algorithms is the Gift wrapping algorithm. To quote Wikipedia:

It has O(nh) time complexity, where n is the number of points and h is the number of points on the convex hull. Its real-life performance compared with other convex hull algorithms is favorable when n is small or h is expected to be very small with respect to n. In general cases the algorithm is outperformed by many others.

So depending on the size of your problem, you might need to take a look on the algorithms page linked above in order to find more advanced approaches.

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Thank you. One little extension to this question: What if the hull needs to shrink-wrap a little (or a lot)? I have a cloud of points which represent a blob of water, so some are a valid indent in the side of the hull. – Matt W Sep 17 '13 at 10:03
Just an thought, but if you use something similar to the gift wrapping algorithm but added a constraint that the next point in the hull must be within a certain distance of a given point you may be able to get your so-called "shink-wrap" effect. I'm not sure how the point cloud is computed but you would have to have some sort of guarantee that a point exists in this distance. – jodag Sep 19 '13 at 6:56

One well-defined such polygon is the convex hull. There are several well-studied algorithms for finding convex hulls.

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