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Possible Duplicate:
find four elements in array whose sum equal to a given number X

Given an array of integers both positive and negative integers,find four distinct numbers that sum upto the specific number say 0. O(n^4) is obviously not a good solution. E.g.

An array contains

0,1,-4,3,7,-8, -11

Here,possible solutions are 0,1,-4,3 or 0,1,7,-8 or 1,3,7,-11

Same values can be repeated.It doesn't matter at all.The only thing to keep in mind that four numbers chosen should have different indices.That's all.

I found some materials regarding efficient solutions but not much of satisfaction to me.If anyone can help me,you are very welcomed.


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marked as duplicate by interjay, Jerry Coffin, Anders K., kapa, Graviton Jul 6 '12 at 4:07

This question has been asked before and already has an answer. If those answers do not fully address your question, please ask a new question.

Is this homework? If so, add homework tag. – TheZ Jul 5 '12 at 16:22
is O(n^3) okay? – Vlad Jul 5 '12 at 16:23
is trying 3 and check whether the other one exists also O(n^3)? – zfm Jul 5 '12 at 16:25
This might be helpful. Same question, done in O(n^2).… – wquist Jul 5 '12 at 16:26
@vj: O(n^3) is actually simple: you choose 3 numbers, and the 4th is desired sum - 1st - 2nd - 3rd, so you just need to check if it's in the set (O(1) with hashset). – Vlad Jul 5 '12 at 16:32

Well, starting at, which is about finding 3 numbers that add up to 0, I would assume that (similar to the related(?) knapsack problem) there's no really great way of doing 4 numbers either.

Now, I'm assuming that the 3SUM algorithm could be adapted to solve the problem of finding 3 numbers that add up to c instead of 0 -- the algorithm given compares with ==0 and <0, so maybe that can be changed to another constant. If that doesn't work you can always multiply every integer with 3 and subtract the constant from each before doing the 3SUM (effectively I want to subtract c/3 from each integer since we're adding 3 of them, but the algorithm says integer numbers...).

The 4th number might introduce another factor "n": iterate over all numbers and incorporate the 4th number into the constant. So that would leave us at n^2 for 3SUM and n^3 for the 4SUM.

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