English

Annealed central limit theorems for the Ising model on random graphs

Probability 2016-02-11 v2 Mathematical Physics math.MP

Abstract

The aim of this paper is to prove central limit theorems with respect to the annealed measure for the magnetization rescaled by N\sqrt{N} of Ising models on random graphs. More precisely, we consider the general rank-1 inhomogeneous random graph (or generalized random graph), the 2-regular configuration model and the configuration model with degrees 1 and 2. For the generalized random graph, we first show the existence of a finite annealed inverse critical temperature 0βcan<0 \leq \beta^{\mathrm \scriptscriptstyle an}_c < \infty and then prove our results in the uniqueness regime, i.e., the values of inverse temperature β\beta and external magnetic field BB for which either β<βcan\beta < \beta^{\mathrm \scriptscriptstyle an}_c and B=0B=0, or β>0\beta>0 and B0B \neq 0. In the case of the configuration model, the central limit theorem holds in the whole region of the parameters β\beta and BB, because phase transitions do not exist for these systems as they are closely related to one-dimensional Ising models. Our proofs are based on explicit computations that are possible since the Ising model on the generalized random graph in the annealed setting is reduced to an inhomogeneous Curie-Weiss model, while the analysis of the configuration model with degrees only taking values 1 and 2 relies on that of the classical one-dimensional Ising model.

Keywords

Cite

@article{arxiv.1509.02695,
  title  = {Annealed central limit theorems for the Ising model on random graphs},
  author = {Cristian Giardinà and Claudio Giberti and Remco van der Hofstad and Maria Luisa Prioriello},
  journal= {arXiv preprint arXiv:1509.02695},
  year   = {2016}
}

Comments

40 pages

R2 v1 2026-06-22T10:52:39.047Z