Directed polymer in γ-stable Random Environments

Abstract

The transition from a weak-disorder (diffusive phase) to a strong-disorder (localized phase) for directed polymers in a random environment is a well studied phenomenon. In the most common setup, it is established that the phase transition is trivial when the transversal dimension d equals 1 or 2 (the diffusive phase is reduced to β=0) while when d≥ 3, there is a critical temperature βc∈ (0,∞) which delimits the two phases. The proof of the existence of a diffusive regime for d≥ 3 is based on a second moment method, and thus relies heavily on the assumption that the variable which encodes the disorder intensity (which in most of the mathematics literature assumes the form eβ ηx), has finite second moment. The aim of this work is to investigate how the presence/absence of phase transition may depend on the dimension d in the case when the disorder variable displays heavier tail. To this end we replace eβ ηx by (1+β ωx) where ωx is in the domain of attraction of a stable law with parameter γ ∈ (1, 2).