Marginal relevance for the γ-stable pinning model

Abstract

We investigate disorder relevance for the pinning of a renewal when the law of the random environment is in the domain of attraction of a stable law with parameter γ ∈ (1,2). Assuming that the renewal jumps have power-law decay, we determine under which condition the critical point of the system modified by the introduction of a small quantity of disorder. In an earlier study of the problem, we have shown that the answer depends on the value of the tail exponent α associated to the distribution of renewal jumps: when α>1-γ-1 a small amount of disorder shifts the critical point whereas it does not when α<1-γ-1. The present paper is focused on the boundary case α=1-γ-1. We show that a critical point shifts occurs in this case, and obtain an estimate for its intensity.