Fine asymptotics of the magnetization of the annealed dilute Curie-Weiss model

Abstract

We consider the dilute Curie-Weiss model of size N, which is a generalization of the classical Curie-Weiss model where the dependency structure between the spins is not encoded by the complete graph but via the (directed) Erdos-R\'enyi graph on N vertices in which every edge appears independently with probability p(N). In the high temperature with external magnetic field regime (0<β<1,h∈R) we prove for p3N2∞ sharp cumulant bounds for the magnetization for the annealed Gibbs measure implying a central limit theorem with rate, a moderate deviation principle, a concentration inequality, a normal approximation bound with Cram\'er correction and mod-Gaussian convergence.

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