# How fast can you sort n elements in the range {1,2,…n^2) given storage space of O(n)?

I am thinking about using counting sort. But I don't think that's answer since k, in this case, is n^2. So the sorting time would be O(n+n^2). Also I think that would exceed the storage limit.

Any ideas?

Thanks.

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Have you taken a look at Quicksort? –  Makoto Dec 31 '11 at 0:42
@Makoto: when you pick a bad pivot for Quicksort, the running time would be O(n^2). Besides, I am given O(n) storage space, so I think I can use a sorting algorithm that requires some space. –  spider Dec 31 '11 at 0:58
Maybe I'm misunderstanding, but this appears to be a two-digit base-n radix sort which is therefore O(n). The first pass buckets on a[i]%n, the second pass buckets on a[i]/n. This requires O(n) auxiliary storage. –  Raymond Chen Dec 31 '11 at 1:03
(PS this sounds a lot like homework, what with the very specific requirements on storage and unusual conditions; please tag as such if so.) –  Raymond Chen Dec 31 '11 at 14:16

You can use a bottom-up merge sort to achieve that, which runs in O(n log n), requiring no additional space (since it is in-place).

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Hmm, beat me by minutes :) –  BlackBear Dec 31 '11 at 0:52