Longtime asymptotics of the two-dimensional parabolic Anderson model with white-noise potential
Abstract
We consider the parabolic Anderson model (PAM) ∂t u = 12 Δu + ξu in R2 with a Gaussian (space) white-noise potential ξ. We prove that the almost-sure large-time asymptotic behaviour of the total mass at time t, written U(t), is given by U(t) χt t for t ∞, with the deterministic constant χ identified in terms of a variational formula. In earlier work of one of the authors this constant was used to describe the asymptotic behaviour λ1(Qt)χ t of the principal eigenvalue λ1(Qt) of the Anderson operator with Dirichlet boundary conditions on the box Qt= [-t2,t2]2.
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