The localization transition for the directed polymer in a random environment is smooth

Abstract

When d 3, the directed polymer a in random environment on Zd is known to display a phase transition from a diffusive phase, known as weak disorder to a localized phase, referred to as strong disorder. This transition is encoded by the behavior of the the free energy of the model, defined by f(β):=N ∞ (1/n) Wβn where Wβn is the normalized partition function for the directed polymer of length n. More precisely weak disorder corresponds to f(β)=0 and strong disorder to f(β)<0. Monotonicity and continuity of f implies that there exists βc∈ [0,∞] such that weak disorder is equivalent to β∈ [0,βc]. Furthermore βc>0 if and only if d 3. We prove that this transition is infinitely smooth in the sense that f grows slower than any power function at the vicinity of βc, that is β βc | f(β)| (β-βc)=∞.