Disorder and critical phenomena: the α=0 copolymer model

Abstract

The generalized copolymer model is a disordered system built on a discrete renewal process with inter-arrival distribution that decays in a regularly varying fashion with exponent 1+ α≥ 1. It exhibits a localization transition which can be characterized in terms of the free energy of the model: the free energy is zero in the delocalized phase and it is positive in the localized phase. This transition, which is observed when tuning the mean h of the disorder variable, has been tackled in the physics literature notably via a renormalization group procedure that goes under the name of strong disorder renormalization. We focus on the case α=0 -- the critical value hc(β) of the parameter h is exactly known (for every strength β of the disorder) in this case -- and we provide precise estimates on the critical behavior. Our results confirm the strong disorder renormalization group prediction that the transition is of infinite order, namely that when h hc(β) the free energy vanishes faster than any power of h-hc(β). But we show that the free energy vanishes much faster than the physicists' prediction.