I'm currently reading The Algorithm Design Manual and I'm stuck on this exercise. Could you help me out please?
Take a sequence of 2n real numbers as input. Design an O(n log n) algorithm that partitions the numbers into n pairs, with the property that the partition minimizes the maximum sum of a pair. For example, say we are given the numbers (1,3,5,9). The possible partitions are ((1,3),(5,9)), ((1,5),(3,9)), and ((1,9),(3,5)). The pair sums for these partitions are (4,14), (6,12), and (10,8). Thus the third partition has 10 as its maximum sum, which is the minimum over the three partitions.
My guess from some examples is that the solution looks like this:
# in pseudo ruby code a = [1,3,5,9] pairs =  while !a.empty? pairs << [a.shift, a.pop] # [a.first, a.last] end pairs
But I can't prove it. Thanks for your help,