Intermittency in a catalytic random medium

Abstract

In this paper, we study intermittency for the parabolic Anderson equation ∂ u/∂ t= u+ u, where u:Zd× [0,∞), is the diffusion constant, is the discrete Laplacian and :Zd×[0,∞) R is a space-time random medium. We focus on the case where is γ times the random medium that is obtained by running independent simple random walks with diffusion constant starting from a Poisson random field with intensity . Throughout the paper, we assume that ,γ,,∈ (0,∞). The solution of the equation describes the evolution of a ``reactant'' u under the influence of a ``catalyst'' . We consider the annealed Lyapunov exponents, that is, the exponential growth rates of the successive moments of u, and show that they display an interesting dependence on the dimension d and on the parameters ,γ,,, with qualitatively different intermittency behavior in d=1,2, in d=3 and in d≥4. Special attention is given to the asymptotics of these Lyapunov exponents for 0 and ∞.

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