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For my algorithm design class homework came this brain teaser:

Given a list of N distinct positive integers, partition the list into two 
sublists of n/2 size such that the difference between sums of the sublists 
is maximized.
Assume that n is even and determine the time complexity.

At first glance, the solution seems to be

  1. sort the list via mergesort
  2. select the n/2 location
  3. for all elements greater than, add to high array
  4. for all elements lower than, add to low array

This would have a time complexity of O((n log n)+ n)

Are there any better algorithm choices for this problem?

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That time complexity reduces to O(nlogn).. –  paislee Jan 27 '12 at 0:51

2 Answers 2

up vote 6 down vote accepted

Since you can calculate median in O(n) time you can also solve this problem in O(n) time. Calculate median, and using it as threshold, create high array and low array.

See http://en.wikipedia.org/wiki/Median_search on calculating median in O(n) time.

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Try

http://en.wikipedia.org/wiki/Selection_algorithm#Linear_general_selection_algorithm_-_Median_of_Medians_algorithm

What you're effectively doing is finding the median. The trick is, once you've found the values, you wouldn't have needed to sort the first n/2 and the last n/2.

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