The scaling limits of the non critical strip wetting model

Abstract

The strip wetting model is defined by giving a (continuous space) one dimensionnal random walk S a reward each time it hits the strip + × [0,a] (where a is a positive parameter), which plays the role of a defect line. We show that this model exhibits a phase transition between a delocalized regime ( < ca) and a localized one ( > ca), where the critical point ca > 0 depends on S and on a. In this paper we give a precise pathwise description of the transition, extracting the full scaling limits of the model. Our approach is based on Markov renewal theory.