Fractional moment bounds and disorder relevance for pinning models

TL;DR

This paper investigates how quenched disorder affects the critical point of directed pinning models, establishing conditions under which disorder is relevant or marginally relevant, especially for different tail behaviors of the contact distribution.

Contribution

It proves disorder relevance or marginal relevance for pinning models with specific tail behaviors of contact distribution, extending previous results to new cases.

Findings

Disorder is relevant for < and >1, with explicit scaling of the critical point difference.

Disorder is marginally relevant at =1/2 under certain conditions on L(.)

The case with L(.) asymptotically constant remains open.

Abstract

We study the critical point of directed pinning/wetting models with quenched disorder. The distribution K(.) of the location of the first contact of the (free) polymer with the defect line is assumed to be of the form K(n)=n^{-\alpha-1}L(n), with L(.) slowly varying. The model undergoes a (de)-localization phase transition: the free energy (per unit length) is zero in the delocalized phase and positive in the localized phase. For \alpha<1/2 it is known that disorder is irrelevant: quenched and annealed critical points coincide for small disorder, as well as quenched and annealed critical exponents. The same has been proven also for \alpha=1/2, but under the assumption that L(.) diverges sufficiently fast at infinity, an hypothesis that is not satisfied in the (1+1)-dimensional wetting model considered by Forgacs et al. (1986) and Derrida et al. (1992), where L(.) is asymptotically constant. Here we prove that, if 1/2<\alpha<1 or \alpha >1, then quenched and annealed critical points differ whenever disorder is present, and we give the scaling form of their difference for small disorder. In agreement with the so-called Harris criterion, disorder is therefore relevant in this case. In the marginal case \alpha=1/2, under the assumption that L(.) vanishes sufficiently fast at infinity, we prove that the difference between quenched and annealed critical points, which is known to be smaller than any power of the disorder strength, is positive: disorder is marginally relevant. Again, the case considered by Forgacs et al. (1986) and Derrida et al. (1992) is out of our analysis and remains open.