Sign up ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free.

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.

share|improve this question
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).

share|improve this answer
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

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.