Independent sets of a given size and structure in the hypercube

Abstract

We determine the asymptotics of the number of independent sets of size β 2d-1 in the discrete hypercube Qd = \0,1\d for any fixed β ∈ [0,1] as d ∞, extending a result of Galvin for β ∈ [1-1/2,1]. Moreover, we prove a multivariate local central limit theorem for structural features of independent sets in Qd drawn according to the hard core model at any fixed fugacity λ>0. In proving these results we develop several general tools for performing combinatorial enumeration using polymer models and the cluster expansion from statistical physics along with local central limit theorems.

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