Disordered systems and (subcritical) polynomial chaos with heavy-tail disorder

Abstract

We study discrete statistical mechanics systems perturbed by a random environment without a finite second moment. Specifically, we consider a random environment whose tail distribution satisfies P[ω > x] x-γ as x +∞ for some γ ∈ (1,2). Inspired by the seminal work of Caravenna, Sun and Zygouras csz2016, we adopt a general framework that encompasses as key examples both the disordered pinning model and the long-range directed polymer model. We provide some subcriticality condition under which we prove that the discrete disordered system possesses a non-trivial scaling limit. We also interpret the subcriticality condition in terms of a generalized Harris criterion without second moment, which gives a prediction for disorder relevance depending on the parameters of the system. Our analysis relies on the study of multilinear polynomials of independent heavy-tailed random variables known as polynomial chaos and their continuous analogue, given by multiple integrals with respect to a γ-stable L\'evy white noise. We develop precise and flexible moments estimates adapted to the heavy-tailed setting.