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I've pulled this algorithm question out of an idea that was being discussed at a forum in January, 2012. You can see details of that here: http://caribbeanopendata.ideascale.com/a/dtd/Underserved-Community-Internet-Access-Baskets-for-BWA-Licensees/85150-16663

I've framed it like this:

A block is defined as a region that has a value v, and a population size, p. A basket, b is defined as a pair of blocks.

Given 12 blocks, find the best pair wise distribution - based on value - of those blocks into baskets.

EDIT: The best pair must not be significantly better than the worst pair. That is, what is sought is not just the best average, but actually the best distribution of value (total area/total number of households).

What algorithm should I look into to solve that question

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SInce their are only 11*10*9*8*7 possibilities, I'd try them all and keep the "best" one. –  wildplasser Mar 7 '12 at 11:40
What is criteria for best pair wise distribution? Do baskets have any constraints, like summation of population should be less that x? –  Sabbir Yousuf Sanny Mar 7 '12 at 11:43
Sabbir, I edited the constraints a bit –  Irwin Mar 7 '12 at 11:48
What is the value of a pair ? The sum of the values of the two blocks ? –  Edouard Mar 7 '12 at 13:47
@Edouard, yes, one basket has a value equal to the sum –  Irwin Mar 9 '12 at 11:04

1 Answer 1

You can use Edmonds Blossom V algorithm to find the maximum matching. This algorithm is used in job applications too. When you have 100 worker and 100 job offer what is the best matching when the worker have more then 1 skill. Usually the best matching is when you can apply some other logic then just lexicographic sorting.

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