A refined graph container lemma and applications to the hard-core model on bipartite expanders
Abstract
We establish a refined version of a graph container lemma due to Galvin and discuss several applications related to the hard-core model on bipartite expander graphs. Given a graph G and λ>0, the hard-core model on G at activity λ is the probability distribution μG,λ on independent sets in G given by μG,λ(I) λ|I|. As one of our main applications, we show that the hard-core model at activity λ on the hypercube Qd exhibits a `structured phase' for λ= ( 2 d/d1/2) in the following sense: in a typical sample from μQd,λ, most vertices are contained in one side of the bipartition of Qd. This improves upon a result of Galvin which establishes the same for λ=( d/ d1/3). As another application, we establish a fully polynomial-time approximation scheme (FPTAS) for the hard-core model on a d-regular bipartite α-expander, with α>0 fixed, when λ= ( 2 d/d1/2). This improves upon the bound λ=( d/ d1/4) due to the first author, Perkins and Potukuchi. We discuss similar improvements to results of Galvin-Tetali, Balogh-Garcia-Li and Kronenberg-Spinka.
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