# Greedy algorithm to pair numbers that minimizes the maximum sum

The input is a sequence of real numbers x1, x2, ..., x2n. We want to pair these numbers into n pairs. For the ith pair, (i = 1, 2, ..., n), let Si denote the sum of numbers in that pair. (For example if you pair x(2i−1) and x2i as the ith pair, Si = x(2i−1) + x2i). We want to pair these numbers so that Maxi[Si] is minimized. Design a greedy algorithm to solve this problem.

That's the question; my solution is to simply sort the numbers and pair the first-last elements and add-one/subtract-one index and repeat. The algorithm tries to optimize for each pair, so that makes it greedy. I'm just wondering if there's a linear time algorithm that will do this?

PS: This is not homework, but I understand this looks very much like it. So I've added the tag to stop people from focusing on having me add a homework tag rather than the question at hand.

Thanks!

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the answer was deleted just now, but i was posting this: here's a link for anyone that is interested in lower bound of comparison based sorting on arbitrary elements. –  cctan Apr 4 '12 at 1:40
I don't know what happened there - the answer seems to have vanished along with my comment! Thanks for the link, I'm aware that comparison based sorting on arbitrary elements has a lower bound of nlgn. What I'm wondering is if there was a linear way to pair the two numbers such that their sum is minimum. I take it what you're trying to say is that there's no other way without sorting and sorting has a lower bound of nlgn? –  user183037 Apr 4 '12 at 2:01
Your solution is correct. Sort numbers and pair first and last iteratively. I can provide proof if you want. –  ElKamina Apr 4 '12 at 5:52

No. There can't be a linear time algo to get this done for you. The input numbers can be in any order so you cant get the pairing done right away with min Maxi[Si]. Your current solution is simple and good.

Suggestions to improve on the running time:

You can create a Binary tree out of the input numbers (this takes O(nlog(n)) time). Do inorder traversal of the tree and create pairs from the (first+i, last-i) elements (i from 0 to n/2)

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Thanks for confirming that! –  user183037 Apr 4 '12 at 16:04
How does the binary tree improve on running time? Why is it any different from using any of the sort methods that run in O(nlgn)? –  user183037 Apr 4 '12 at 23:00
If you use sorting algo of O(nlgn), then it will be of same order as binary tree. –  Tejas Patil Apr 5 '12 at 2:12