# 3SUM algorithm when integers are in a given range? [closed]

Given an integer array find 3 elements in it that sum up to zero.

This is a well known 3-SUM problem and can be solved in O(n^2).

Here is the wiki link for the same: http://en.wikipedia.org/wiki/3SUM

But It also states that

When the integers are in the range [-u,..,u] , 3SUM can be solved in time O(n+ulogu) by representing the input set S as a bit vector, computing the set S+S of all pairwise sums as a discrete convolution using the Fast Fourier transform, and finally comparing this set to -S.

can somebody please elaborate the above solution?

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## closed as unclear what you're asking by p.s.w.g, Sam I am, Klas Mellbourn, jball, EvertJun 26 '13 at 0:44

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+1, but what is the question? Do you want to know how FFT works which is explained typically in textbooks with a chapter or so , or assuming FFT is a black box and how the algorithm works given that box? – Ziyao Wei Jun 25 '13 at 21:03
@ZiyaoWei I think OP wants a simplier explanation of the answer here: stackoverflow.com/questions/10976854/finding-triplets – Daniel Jun 25 '13 at 21:07
@Daniel nice find, +1. – Ziyao Wei Jun 25 '13 at 21:09
Another way to arrange these ideas is to compute the set S + S + S defined by the comprehension {x + y + z for x in S for y in S for z in S} and test whether 0 is an element. The FFT computes S + T = {x + y for x in S for y in T} efficiently when the range is O(u). – David Eisenstat Jun 25 '13 at 21:47