Fat-tailed and compact random-field Ising models on cubic lattices

Abstract

Using a single functional form which is able to represent several different classes of statistical distributions, we introduce a preliminary study of the ferromagnetic Ising model on the cubic lattices under the influence of non-Gaussian local external magnetic field. Specifically, depending on the value of the tail parameter, τ (τ < 3), we assign a quenched random field that can be platykurtic (sub-Gaussian) or leptokurtic (fat-tailed) form. For τ< 5/3, such distributions have finite standard deviation and they are either the Student-t (1< τ< 5/3) or the r-distribution (τ< 1) extended to all plausible real degrees of freedom with the Gaussian being retrieved in the limit τ → 1. Otherwise, the distribution has got the same asymptotic power-law behaviour as the α-stable L\'evy distribution with α = (3 - τ)/(τ - 1). The uniform distribution is achieved in the limit τ → ∞. Our results purport the existence of ferromagnetic order at finite temperatures for all the studied values of τ with some mean-field predictions surviving in the three-dimensional case.