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So, if two points A(x1,y1) and B(x2,y2) are given, and if x1 <= x2 and y1<= y2, then we say B dominates A. Now, given a lot of points, I wish to find out all the non-dominated points. Trivial approach is compare every point with others and get all non-dominated points. But it's O(n^2). So I tried divide and conquer, pretty straightforward and I get to find that in O(nlogn). Our professor says, it can still be done in O(n). I kind of think it's really not possible. I'm not asking you to solve this for me, but would like to know if there's any 'obvious' way through which I can be sure that it can't be done in O(n) under any conditions? However, if it's really possible, don't answer, maybe give some clue.

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Related question. I'm not sure an O(n) algorithm is possible either - as far as I know, there'd have to be a sorting step. –  Dukeling Sep 27 '13 at 21:05
    
Is the given list of points ordered in any way? –  Adam Sep 27 '13 at 21:14
    
I must be missing something in the definition, because it seems it could be solved trivially by running through the unordered points once, remembering the point(s) with the largest x and those with the largest y. At the end, the points in both sets are not dominated. –  hatchet Sep 27 '13 at 21:16
    
@hatchet (5,0), (4,1), (3,2) - None of those are dominated. –  Dukeling Sep 27 '13 at 21:18
    
@Dukeling - thanks, I see what I was missing now. –  hatchet Sep 27 '13 at 21:20

1 Answer 1

If the points are already sorted by one of the coordinates (say the x-coordinate), this can be done in O(n) as follows:

  • Process the points from the largest x-coordinate.
    • As you go through them, keep track of the largest y-coordinate.
    • If the current point's y-coordinate is smaller than the largest y-coordinate thus far, it's dominated by another point. Otherwise, it's not dominated, so add it to the output.

If the points aren't already sorted, I don't think there's an O(n) solution (but I suppose we can wait and see).

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This approach is still O(nlogn) if the points aren't sorted. –  Adam Sep 27 '13 at 21:33
    
In the comparison model for unsorted inputs, the lower bound is Omega(n log n). The proof idea is to have n/2 points at (x, K - x) and n/2 at (x, K - 1 - x) for variable integers x; every correct comparison-based algorithm is forced to determine, for each point of the second type, the insertion index in the "staircase" formed by the points of the first type. –  David Eisenstat Sep 27 '13 at 22:08
    
Make that (x, K - 0.5 - x) instead of (x, K - 1 - x). –  David Eisenstat Sep 27 '13 at 22:23

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