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I have a set of 2D points and need to find the fastest way to figure out which pair of points has the shortest distance in the set.

What is the optimal way to do this? My approach is to sort them with quicksort and then calculate the distances. This would be O(nlogn + n) = O(nlogn).

Is it possible to do it in linear time?

Thanks.

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How do you sort two dimensional data with quicksort? And how does this help finding the two closest points? –  Daniel Brückner Apr 25 '09 at 11:48
    
I just sort them by x coordinate. Basically it seems I implemented the algorithm explained at en.wikipedia.org/wiki/Closest_pair_problem. First sort by x, then divide and conquer. So it seems there is no faster way. –  Pietr Apr 25 '09 at 12:00
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Sorting by X is of no real value at all, since the closest points may not have close X values. And sorting by X doesn't reduce the need to compare every point against every other point to find the closest pair. –  S.Lott Apr 25 '09 at 12:08
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Actually it does. Look at the Wikipedia link above and the divide and conquer solution. It is O(N log N). –  Pietr Apr 25 '09 at 12:23
    
The Wikipedia article says it's actually O(n log log n) if floor is a constant time operation (however, I don't think it actually is, for arbitrarily large numbers) –  Matthew Flaschen Apr 26 '09 at 3:35
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3 Answers

If you could probe out a constant amount from each point and use iterative deepening DFS, youd never check further apart than the two closest points...and since you're not dependent on a failed pass, you'd never need to recompute the way ID DFS tends to.

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No. Minimum distance among ALL points in O( n ^ 2 ) because you must compare every point against every other point. Technically it's n * n / 2 because you only have to fill have to fill half the matrix.

There are faster algorithms are for finding the nearest neighbor to a given point. Unfortunately, you have to then do this for every point to find the closest two points.

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The diagram isn't an algorithm. The Fortune Algorithm produces the diagram. en.wikipedia.org/wiki/Fortune%27s_algorithm. I'm not sure this applies, since it partitions space rather than compares points. –  S.Lott Apr 25 '09 at 12:07
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