Maximum Collinear points in a plane

`N` points are given as input.

Let's say `(x1,y1), (x2,y2)... (xn,yn)`.

Is there a non-combinatorial solution to find the maximum number of collinear points? Can they be arranged in a fancy data structure that would help this computation?

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Take a look at this question and its answers: stackoverflow.com/questions/4179581/… –  brainjam Dec 8 '10 at 16:38

For each point i, find the slope to every other point j and look for duplicates. Duplicates can be found by sorting the slopes and comparing adjacent values. Point i is collinear with the points in each set of duplicates. Keep track of the maximal set as you go.

For each i, you have n-1 slopes to calculate and sort and compare. Therefore, using a log n sort, the complexity of the algorithm is O(n^2 log n).

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Pairs of points might have the same slope but be parallel rather than collinear. You need to look at the y-intercept as well as the slope. –  Gareth Rees Dec 8 '10 at 14:48
The slopes are relative to the point i currently being investigated. So there is no possibility for parallel lines. –  kotlinski Dec 8 '10 at 15:03