Mass concentration and aging in the parabolic Anderson model with doubly-exponential tails

Abstract

We study the solutions u=u(x,t) to the Cauchy problem on Zd×(0,∞) for the parabolic equation ∂t u= u+ u with initial data u(x,0)=1\0\(x). Here is the discrete Laplacian on Zd and =((z))z∈ Zd is an i.i.d.\ random field with doubly-exponential upper tails. We prove that, for large t and with large probability, a majority of the total mass U(t):=Σx u(x,t) of the solution resides in a bounded neighborhood of a site Zt that achieves an optimal compromise between the local Dirichlet eigenvalue of the Anderson Hamiltonian + and the distance to the origin. The processes t Zt and t 1t U(t) are shown to converge in distribution under suitable scaling of space and time. Aging results for Zt, as well as for the solution to the parabolic problem, are also established. The proof uses the characterization of eigenvalue order statistics for + in large sets recently proved by the first two authors.