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
- sort the list via mergesort
- select the n/2 location
- for all elements greater than, add to high array
- 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?