On the expected value of the minimum assignment

Abstract

The minimum k-assignment of an m by n matrix X is the minimum sum of k entries of X, no two of which belong to the same row or column. If X is generated by choosing each entry independently from the exponential distribution with mean 1, then Coppersmith and Sorkin conjectured that the expected value of its minimum k-assignment is Σi,j 0, i+j<k 1/((m-i)(n-j)) and they (with Alm) have proven this for k < 5 and in certain cases when k=5 or k=6. They were motivated by the special case of k=m=n, where the expected value was conjectured by Parisi to be Σi=1k 1/(i2). In this paper we describe our efforts to prove the Coppersmith-Sorkin conjecture. We give evidence for the following stronger conjecture, which generalizes theirs. Conjecture. Suppose that r1,...,rm and c1,...,cn are positive real numbers. Let X be a random m by n matrix in which entry xij is chosen independently from the exponential distribution with mean 1/(ricj). Then the expected value of the minimum k-assignment of X is ΣI,J (-1)k - 1 - |I| - |J| m + n - 1 - |I| - |J|k - 1 - |I| - |J|1(Σi Iri) (Σj J cj). Here the sum is over proper subsets I of 1,...,m and J of 1,...,n whose cardinalities |I| and |J| satisfy |I|+|J|<k.

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