Disorder relevance without Harris Criterion: the case of pinning model with γ-stable environment

Abstract

We investigate disorder relevance for the pinning of a renewal whose inter-arrival law has tail exponent α>0 when the law of the random environment is in the domain of attraction of a stable law with parameter γ ∈ (1,2). We prove that in this case, the effect of disorder is not decided by the sign of the specific heat exponent as predicted by Harris criterion but that a new criterion emerges to decide disorder relevance. More precisely we show that when α>1-γ-1 there is a shift of the critical point at every temperature whereas when α< 1-γ-1, at high temperature the quenched and annealed critical point coincide, and the critical exponents are identical.