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2001
ACM

Sharp threshold and scaling window for the integer partitioning problem

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Sharp threshold and scaling window for the integer partitioning problem
We consider the problem of partitioning n integers chosen randomly between 1 and 2m into two subsets such that the discrepancy, the absolute value of the difference of their sums, is minimized. A partition is called perfect if the optimum discrepancy is 0 when the sum of all n integers in the original set is even, or 1 when the sum is odd. Parameterizing the random problem in terms of = m/n, we prove that the problem has a sharp threshold at = 1, in the sense that for < 1, there are many perfect partitions with probability tending to 1 as n , while for > 1, there are no perfect
Christian Borgs, Jennifer T. Chayes, Boris Pittel
Added 03 Dec 2009
Updated 03 Dec 2009
Type Conference
Year 2001
Where STOC
Authors Christian Borgs, Jennifer T. Chayes, Boris Pittel
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