Intermittency on catalysts: three-dimensional simple symmetric exclusion

Abstract

We continue our study of intermittency for the parabolic Anderson model ∂ u/∂ t = u + u in a space-time random medium , where is a positive diffusion constant, is the lattice Laplacian on d, d ≥ 1, and is a simple symmetric exclusion process on d in Bernoulli equilibrium. This model describes the evolution of a reactant u under the influence of a catalyst . In G\"artner, den Hollander and Maillard (2007) we investigated the behavior of the annealed Lyapunov exponents, i.e., the exponential growth rates as t∞ of the successive moments of the solution u. This led to an almost complete picture of intermittency as a function of d and . In the present paper we finish our study by focussing on the asymptotics of the Lyaponov exponents as ∞ in the critical dimension d=3, which was left open in G\"artner, den Hollander and Maillard (2007) and which is the most challenging. We show that, interestingly, this asymptotics is characterized not only by a Green term, as in d≥ 4, but also by a polaron term. The presence of the latter implies intermittency of all orders above a finite threshold for .