# Algorithm to find the global minimal distance between item pairs

The items a-d are to be paired with items 0-3 in such a way that the total distance between all item pairs are minimized. For example, this matrix could describe the distance between each item in the first group and an item in its counterpart group:

``````[[2, 2, 4, 9],
[4, 7, 1, 1],
[3, 3, 8, 3],
[6, 1, 7, 8]]
``````

This is supposed to mean that the distance 'a' -> '0' is 2, from 'a' -> '1' is 2, from 'a' -> '2' is 4, 'a' -> '3' is 9. From 'b' -> '0' it is 4 and so on.

Is there an algorithm that can match each letter with a digit, so that the total distance is minimized? E.g.:

``````[('a', 1), ('b', 3), ('c', 0), ('d', 2)]
``````

Would be a legal solution with total distance: 2 + 1 + 3 + 7 = 13. Brute forcing and testing all possible combinations is not possible since the real world has groups with much more than four items in them.

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IMHO the only way is brute-force as you descripe it. Is there a some kind of connection between the two sets? –  Carsten König Aug 17 '11 at 12:17
I don't understand exactly what the rules are. Are you only allowed to pick one number out of each row and only allowed to pick one number out of each column, and you have to pick 4 numbers, and you want the sum of these 4 numbers to be minimized? –  robert king Aug 17 '11 at 12:27
CKoening, I would be interested to know why you dont think there's a solution. Have I stumbled upon an NP-hard problem? –  Björn Lindqvist Aug 17 '11 at 12:29
I guess the part I don't understand is "match each letter with a digit, so that the total distance is the solution is minimized?" surely you would just match each letter to its closest digit? or are you only allowed to use each digit once? –  robert king Aug 17 '11 at 12:35
robert king, that is exactly right. Think of it like when you do your laundry. You want to match each of your four right socks with the most similar left sock. –  Björn Lindqvist Aug 17 '11 at 12:36
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This is a classic optimization task for bipartite graphs and can be solved with the Hungarian algorithm/method.

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