N
points are given as input.
Let's say (x1,y1), (x2,y2)... (xn,yn)
.
Is there a noncombinatorial solution to find the maximum number of collinear points? Can they be arranged in a fancy data structure that would help this computation?
Let's say Is there a noncombinatorial solution to find the maximum number of collinear points? Can they be arranged in a fancy data structure that would help this computation? 


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 n1 slopes to calculate and sort and compare. Therefore, using a (n log n) sorting, the complexity of the algorithm is O(n^2 log n). 


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