On the free energy density of factor models on biregular graphs

Abstract

Let h(0),h(1),…,h(k) be a symmetric concave sequence. For a (d,k)-biregular factor graph G and x∈ \0,1\V, we define the Hamiltonian \[HG(x)=Σf∈ F h(Σv∈ ∂ f xv),\] where V is the set of variable nodes, F is the set of factor nodes. We prove that if (Gn) is a large girth sequence of (d,k)-biregular factor graphs, then the free energy density of Gn converges. The limiting free energy density is given by the Bethe-approximation.