# Measure the uniformity of distribution of points in a 2D square

I am currently running into this problem: I have a 2D square, and have a set of points inside it, say, 1000 points. I need a way to see if the distribution of points inside the square are spread out (or more or less uniformly distributed) or they tend to gather together in some spot area inside the square.

Need a mathematical/statistical (not programming) way to determine this. I googled, found something like goodness of fit, Kolmogorov... and just wonder if there are other approaches to achieve this. Need this for class paper.

So: Inputs: a 2D square, and 1000 points. Output: yes/no (yes = evenly spread out, no = gathering together in some spots).

Any idea would be appreciated. Thanks

-
Hi! Stackoverflow is really for programming Q&A, you might have better chances on the math stackexchange or maybe stats –  jrdn Oct 22 '12 at 5:22
Vote to close as it has been asked on Cross Validated. –  Brent Worden Oct 23 '12 at 2:57