Models of Gradient Type with Sub-Quadratic Actions

Abstract

We consider models of gradient type, which are the densities of a collection of real-valued random variables φ :=\φx: x ∈ \ given by Z-1(-Σj kV(φj-φk)). We focus our study on the case that V(∇φ) = [1+(∇φ)2]α with 0 < α < 1/2, which is a non-convex potential. We introduce an auxiliary field tjk for each edge and represent the model as the marginal of a model with log-concave density. Based on this method, we prove that finite moments of the fields <[v · φ]p > are bounded uniformly in the volume. This leads to the existence of infinite volume measures. Also, every translation invariant, ergodic infinite volume Gibbs measure for the potential V above scales to a Gaussian free field.