Ising models on locally tree-like graphs

Amir Dembo, Andrea Montanari

Type: Article

Publication Date: 2010-03-09

Citations: 146

DOI: https://doi.org/10.1214/09-aap627

Abstract

We consider ferromagnetic Ising models on graphs that converge locally to trees. Examples include random regular graphs with bounded degree and uniformly random graphs with bounded average degree. We prove that the "cavity" prediction for the limiting free energy per spin is correct for any positive temperature and external field. Further, local marginals can be approximated by iterating a set of mean field (cavity) equations. Both results are achieved by proving the local convergence of the Boltzmann distribution on the original graph to the Boltzmann distribution on the appropriate infinite random tree.

Locations

arXiv (Cornell University) - View - PDF
HAL (Le Centre pour la Communication Scientifique Directe) - View
DataCite API - View
The Annals of Applied Probability - View - PDF

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