# algorithm to sort elements of three arrays

Here's the stumper:

Start with three arrays A, B and C with a total of `2n+1` entries. Write an algorithm to sort all of the entries from all of the arrays using only the following two methods:

1. `X = sort(X)` replaces the array `X` with the sorted version.

2. `(X , Y) = doubleUp(X , Y)` does nothing if `X` has more elements than `Y`, otherwise it removes the first `length(X)` entries from `Y` and appends them to the end of `X`.

Here's what I've tried so far. If two of the arrays are empty, then just use `sort` on the nonempty array.

If one of the arrays is empty, then I think I can use `doubleUp` to get one array to have just one thing and the other array to have everything else, and if that singleton array has the smallest (or largest) element, then that works. So I can use `sort` after I use `doubleUp` each time to make sure this happens. I coded this up in Maple and it worked for all the cases I checked.

I have no idea how to do it with 3 arrays though. Anyone have any ideas?

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This almost sounds like a homework problem.. –  phs Sep 5 '11 at 19:22
Almost. I'm trying to prepare for interview-questions. –  Daniel Sep 5 '11 at 19:23
Could I ask you where this interview-question was asked? It seems a bit weird, or incomplete, or that'll have a strange solution that's not usefull anywhere else. I got curious –  woliveirajr Sep 5 '11 at 19:49
@woliveirajr: Sometimes such "stupid" question asked not to see if you know the answer or would find the solution, but to see how the candidate approaches the problem, how he thinks, and how he solves problems. –  flolo Sep 5 '11 at 20:28

Sounds like nonsense. The total number of entries is odd. The only way to increase the length of an array is to make it the smaller first argument of `doubleUp`, in which case it ends up with an even number of elements. So unless all the elements are in one array to begin with there's no way to make one array contain all the elements, sorted or otherwise.
The OP never argued that all the elements end up in 1 array. Only that there is one singleton and the other contains `2n` elements. That he can do that isn't yet clear to me, but doesn't sound implausible. –  PengOne Sep 5 '11 at 19:27
@PengOne: I think I've stumbled over a counter-example: if the two non-empty arrays have initial sizes 3 and 1668, then repeatedly applying `doubleUp` (with the smallest first) returns to sizes 3, 1668 after 278 steps, without passing through 1, 1670. Since the sum of sizes is invariant, every starting pair must repeat within a number of steps equal to that sum, so it should be fairly easy to brute-force for the smallest counter-example even if there's no simple mathematical property that decides it... –  Steve Jessop Sep 5 '11 at 19:51