Curie-Weiss Model under p constraint and a Generalized Hubbard-Stratonovich Transform

Abstract

We consider the Ising Curie-Weiss model on the complete graph constrained under a given p norm for some p>0. For p=∞, it reduces to the classical Ising Curie-Weiss model. We prove that for all p>2, there exists βc(p) such that for β<βc(p), the magnetization is concentrated at zero and satisfies an appropriate Gaussian CLT. In contrast, for β>βc(p) the magnetization is concentrated at m for some m>0. We have βc(p)>1 for p>2 and p∞βc(p)=3. We further generalize the model for general symmetric spin distributions and prove a similar phase transition. For 0<p<1, the log-partition function scales at the order of n2/p-1. The proofs are based on a generalized Hubbard-Stratonovich (GHS) transform, which is of independent interest.

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