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Given a set of n points in an X-Y plane, how can I determine if every point is at least separated by every other point by a Manhattan distance of 5 units in time less than O(n^2)?

What is the best algorithm to implement this?

Thank you.

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3  
This is not a question but an assignment. –  Bart Kiers Apr 27 '11 at 21:02
5  
How do you know that's an assignment? This easily is an interview question. –  arasmussen Apr 27 '11 at 21:03
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@arasmussen, "assignment" does not necessarily mean homework. My point is that the OP did not ask a question. –  Bart Kiers Apr 27 '11 at 21:06
    
Good point. Zaya, what work have you done on this question so far? What are your thoughts? What does it mean for the algorithm that it is less than O(n^2)? –  arasmussen Apr 27 '11 at 21:08
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@arasmussen I totally agree with Bart. I think you didn't get his point. What he meant is that the sentence given by zaya is an assignment (order). It is written in imperative form. It is not a question asking something. –  sawa Apr 27 '11 at 21:09

1 Answer 1

up vote 3 down vote accepted
  1. Sort the points by x. This takes time 'O(n log(n))'.

  2. Divide the range into strips of width 10. (You'll need an obvious bit of care here for the pathological case where one point has x-coordinate 1 and the next has x-coordinate 1020.) O(n)

  3. For each strip:

    1. Take the set of points within that strip, or within an x of 5 to either side, and sort them by y. This is O(n log(n)) across all strips.
    2. For each point in the strip, find the Manhattan distance to all other points in that slightly wider strip whose y coordinate is within 5 of their own. If you find any within distance 5, exit and report false. This is O(n) across all strips.
  4. Report true.

This algorithm is O(n log(n)). I strongly advise that you demonstrate for yourself that the pointwise Manhattan comparison in 1.2 takes O(n) operations, even if the answer is false.

For true it is simple - it follows from the fact that there is a maximum number of other points that can be squeezed in a 20x10 box without 2 getting within 5. For false it is trickier, you can have a lot of other points in that box, but by the time you have compared a fixed number of them to the rest, you must have found two within distance 5. Either way a given point participates in a fixed maximum number of point to point comparisons before you have your answer.

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1  
how is sorting by y for all strips O(n)? Using radix sort? –  DShook Apr 27 '11 at 21:34
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@DShook: Because I had a brain fart. Fixed. –  btilly Apr 27 '11 at 22:20
    
I might be wrong here, but since you have up to n strips, sorting each of those strips by y results in n * (n log(n)) operations, meaning n^2 log(n). Am I wrong? I recognize that in practice it will be a much diminished set (i.e. if there are many strips, then the values in each are limited, so the internal sorting is smaller; if there are few strips then there are few sorts) so it should be fast, but it still technically seems n^2 log(n) to me... –  DRobinson Feb 19 '13 at 15:00
    
@DRobinson If there are n strips, then each sort is O(1). In general if you have k lists and n things between them, sorting all k lists cannot be worse than sorting n things with up to k labels by label and then by thing, so no matter how many lists there are it is no worse than O(n log(n)) to sort them all. –  btilly Feb 21 '13 at 2:28
    
Yes, but take for example a situation where there is n/2 strips, two of which each have about n/4 elements (the remaining n/2 elements are distributed among the remaining (n/2 - 2) strips). Is this not, technically, going over O(n) strips (because there are n/2 of them), and in each sorting O(n) [because worst case has n/4 -> O(n)] values? That would be O(n/2 * O(n/4 log(n/4)) = O(n * nlog(n)). Obviously it will be much faster but in pure big O that still seems like n^2log(n) to me. –  DRobinson Feb 21 '13 at 19:37

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