Probabilistic Analysis of the Number Partitioning Problem
Abstract
Given a sequence of N positive real numbers \a1,a2,..., aN \, the number partitioning problem consists of partitioning them into two sets such that the absolute value of the difference of the sums of aj over the two sets is minimized. In the case that the aj's are statistically independent random variables uniformly distributed in the unit interval, this NP-complete problem is equivalent to the problem of finding the ground state of an infinite-range, random anti-ferromagnetic Ising model. We employ the annealed approximation to derive analytical lower bounds to the average value of the difference for the best constrained and unconstrained partitions in the large N limit. Furthermore, we calculate analytically the fraction of metastable states, i.e. states that are stable against all single spin flips, and found that it vanishes like N-3/2.
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