# Theoretical Algorithm for finding closet 2 points on a circle in O(n)

Given n points on the outline of the unit circle, I want to calculate the closest 2 points.

The points are not ordered, and I need to do it in O(n) (so I cannot sort them clockwise...)

I once knew the solution for this, but forgot it... the solution includes hashing, and splitting the circle to n or more slices.

If you found an algorithm to calculate only the distance, and not the specific points, it will be good enough..

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Sort them by angle by placing them in bins (binsort, `O(n)`); choose a number of bins of the same order as the number of points. Then walk through and find the closest pair, repeating the process within a bin if more than one point falls in it.
@Oren - You are correct about the assumption. I could give you a set of points that are spaced apart with exponentially decreasing distance, and you're not going to do better than `O(N log N)` with that. My suggestion is the same as the one @Jim Lewis linked to; I don't know how they get `O(N log log N)`; in the random case, you expect a reduction of the number of points to examine by (e-2)/e per `O(N)` step (if you choose # bins = # points (property of Poisson distribution)), and the geometric series of that is just 1/(1-e/(e-2)) = (e-2)/2, which is just a constant factor. – Rex Kerr Sep 17 '10 at 1:55