Given a set of points on a plane, find the shortest line segment formed by any two of these points.
How can I do that? The trivial way is obviously to calculate each distance, but I need another algorithm to compare.
Given a set of points on a plane, find the shortest line segment formed by any two of these points. How can I do that? The trivial way is obviously to calculate each distance, but I need another algorithm to compare. 


http://en.wikipedia.org/wiki/Closest%5Fpair%5Fof%5Fpoints The problem can be solved in O(n log n) time using the recursive divide and conquer approach, e.g., as follows:



You can extract the closest pair in linear time from the Delaunay triangulation and conversly from Voronoi diagram. 


There is relatively simple line sweep algorithm that can find the closest pair of points in O(nlogn) time. This article has a short explanation. 


There is a standard algorithm for this problem, here you can find it: http://www.cs.mcgill.ca/~cs251/ClosestPair/ClosestPairPS.html And here is my implementation of this algo, sorry it's without comments:



One possibility would be to sort the points by their X coordinates (or the Y  doesn't really matter which, just be consistent). You can then use that to eliminate comparisons to many of the other points. When you're looking at the distance between point[i] and point[j], if the X distance alone is greater than your current shortest distance, then point[j+1]...point[N] can be eliminated as well (assuming If your points start out as polar coordinates, you can use a variation of the same thing  sort by distance from the origin, and if the difference in distance from the origin is greater than your current shortest distance, you can eliminate that point, and all the others that are farther from (or closer to) the origin than the one you're currently considering. 


http://blogs.mathworks.com/videos/2008/06/02/matlabpuzzlerfindingthetwoclosestpoints/ This has a whole big bunch of different solutions. Kinda neat to see how many ways there are to the same answer. 


I can't immediately think of a quicker alternative than the brute force technique (although there must be plenty) but whatever algorithm you choose don't calculate the distance between each point. If you need to compare distances just compare the squares of the distances to avoid the expensive and entirely redundant square root. 

