Fluctuations of the Magnetization for Ising Models on Erdos-R\'enyi Random Graphs -- the Regimes of Small p and the Critical Temperature

Abstract

We continue our analysis of Ising models on the (directed) Erdos-R\'enyi random graph. This graph is constructed on N vertices and every edge has probability p to be present. These models were introduced by Bovier and Gayrard [J. Stat. Phys., 1993] and analyzed by the authors in a previous note, in which we consider the case of p=p(N) satisfying p3N2 +∞ and β <1. In the current note we prove a quenched Central Limit Theorem for the magnetization for p satisfying pN ∞ in the high-temperature regime β<1. We also show a non-standard Central Limit Theorem for p4N3 ∞ at the critical temperature β=1. For p4N3 0 we obtain a Gaussian limiting distribution for the magnetization. Finally, on the critical line p4N3 c the limiting distribution for the magnetization contains a quadratic component as well as a x4-term. Hence, at β=1 we observe a phase transition in p for the fluctuations of the magnetization.