Ising model with Curie-Weiss perturbation

Abstract

Consider the nearest-neighbor Ising model on n:=[-n,n]dd at inverse temperature β≥ 0 with free boundary conditions, and let Yn(σ):=Σu∈nσu be its total magnetization. Let Xn be the total magnetization perturbed by a critical Curie-Weiss interaction, i.e., equation* d FXnd FYn(x):=[x2/(2 Yn2 _n,β)][Yn2/(2 Yn2_n,β)]_n,β, equation* where FXn and FYn are the distribution functions for Xn and Yn respectively. We prove that for any d≥ 4 and β∈[0,βc(d)] where βc(d) is the critical inverse temperature, any subsequential limit (in distribution) of \Xn/E(Xn2):n∈N\ has an analytic density (say, fX) all of whose zeros are pure imaginary, and fX has an explicit expression in terms of the asymptotic behavior of zeros for the moment generating function of Yn. We also prove that for any d≥ 1 and then for β small, equation* fX(x)=K(-C4x4), equation* where C=(3/4)/(1/4) and K=(3/4)/(4(5/4)3/2). Possible connections between fX and the high-dimensional critical Ising model with periodic boundary conditions are discussed.