Array “maximum difference” algorithm that runs in O(n)?

Given an array of N integers, sort the array, and find the 2 consecutive numbers in the sorted array with the maximum difference. Example – on input [1,7,3,2] output 4 (the sorted array is [1,2,3,7], and the maximum difference is 7-3=4).

Algorithm A runs in O(NlogN) time.

I need to find an algorithm identical in function to algorithm A, that runs in O(N) time.

UPDATE:

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And what paths have you explored so far? –  Daniel Fischer Apr 21 '12 at 20:59
You just need to return the maximum difference, right? You don't have to return the sorted array as well? –  Adam Mihalcin Apr 21 '12 at 21:02
Counting and Radix sorts might give you O(n). From there you can easily figure out the max diff using an O(n) algorithm. O(n) + O(n) = O(n). –  OJ. Apr 21 '12 at 21:06
Yes, I only need maximum difference. Integer sizes are not limited, so Counting/Radix this time wont work –  daremy Apr 21 '12 at 21:11

Let the array be X and let n = length(X). Put each element x in bucket number floor((x - min(X)) * (n - 1) / (max(X) - min(X))). The width of each bucket is (max(X) - min(X))/(n - 1) and the maximum adjacent difference is at least that much, so the numbers in question wind up in different buckets. Now all we have to do is consider the pairs where one is the max in bucket i and the other is the min in bucket j where i < j and all buckets k in (i, j) are empty. This is linear time.

Proof that we really need floor: let the function be f(X). If we could compute f(X) in linear time, then surely we could decide in linear time whether

0 < f(X) ≤ (max(X) - min(X))/(length(X) - 1),

i.e., whether the elements of X are evenly spaced and not all identical. Let this predicate be P(X). The support of P has factorial(length(X)) connected components, so the usual Ω(n log n) lower bounds for algebraic models of computation apply.

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