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Two sets of 'n' numbers are given A and B. Chose one element from A and one from B such that the sum is equal to a given value, 'val'.

I have got the solution as:

We can hash the elements of Set A and Set B and check for every element in set A whether val-arr[i] exists in the hash of Set B or not. This would take O(n) time and O(n) space Can there be a better solutions with space as O(1) and time O(n)?

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  • take a look at answers to this question
    – soulcheck
    Apr 7, 2012 at 15:48
  • Then, no. The only other approach close to this would be to sort both arrays and do a reverse merge/match. The match is O(n) and no space (so O(1)), but the sorts are O(N*LogN) time and O(LogN) space. Apr 7, 2012 at 15:53
  • Are the values limited by some maximum, or are they truly arbitrary? Are they integers?
    – Adam Liss
    Apr 7, 2012 at 15:59
  • I don't think so. Maybe you could come up with something using parallel computing? Like sort the array in O(n) and think of what to do next... Dunno.
    – lampak
    Apr 7, 2012 at 16:00
  • @lampak: Parallel processing doesn't reduce the time-complexity of an algorithm... Apr 7, 2012 at 17:24

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As you have both the arrays NOT sorted, you have NO other option but look at every element one-by-one. So, you cannot get below O(n) running time. I think the approach you are using is ok.

Read these related posts:

Given two arrays a and b .Find all pairs of elements (a1,b1) such that a1 belongs to Array A and b1 belongs to Array B whose sum a1+b1 = k

Find two elements in an array that sum to k

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