Complete localisation in the parabolic Anderson model with Pareto-distributed potential
Abstract
The parabolic Anderson problem is the Cauchy problem for the heat equation ∂t u(t,z)= u(t,z)+(z) u(t,z) on (0,∞)× Zd with random potential ((z) z∈ Zd). We consider independent and identically distributed potential variables, such that Prob((z)>x) decays polynomially as x∞. If u is initially localised in the origin, i.e. if u(0,x)=0(x), we show that, at any large time t, the solution is completely localised in a single point with high probability. More precisely, we find a random process (Zt t 0) with values in d such that t ∞ u(t,Zt)/Σz∈d u(t,z) =1, in probability. We also identify the asymptotic behaviour of Zt in terms of a weak limit theorem.
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