A polynomial-time approximation scheme for the maximal overlap of two independent Erdos-R\'enyi graphs
Abstract
For two independent Erdos-R\'enyi graphs G(n,p), we study the maximal overlap (i.e., the number of common edges) of these two graphs over all possible vertex correspondence. We present a polynomial-time algorithm which finds a vertex correspondence whose overlap approximates the maximal overlap up to a multiplicative factor that is arbitrarily close to 1. As a by-product, we prove that the maximal overlap is asymptotically n2α-1 for p=n-α with some constant α∈ (1/2,1).
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