Spectral Analysis of Lattice Schr\"odinger-Type Operators Associated with the Nonstationary Anderson Model and Intermittency

Abstract

The research explores a high irregularity, commonly referred to as intermittency, of the solution to the non-stationary parabolic Anderson problem: equation* ∂ u∂ t = Lu(t,x) + t(x)u(t,x) equation* with the initial condition \(u(0,x) 1\), where \((t,x) ∈ [0,∞)× Zd\). Here, \( L\) denotes a non-local Laplacian, and \(t(x)\) is a correlated white noise potential. The observed irregularity is intricately linked to the upper part of the spectrum of the multiparticle Schr\"odinger equations for the moment functions \(mp(t,x1,x2,·s,xp) = u(t,x1)u(t,x2)·s u(t,xp)\). In the first half of the paper, a weak form of intermittency is expressed through moment functions of order p≥ 3 and established for a wide class of operators L with a positive-definite correlator B=B(x)) of the white noise. In the second half of the paper, the strong intermittency is studied. It relates to the existence of a positive eigenvalue for the lattice Schr\"odinger type operator with the potential B. This operator is associated with the second moment m2. Now B is not necessarily positive-definite, but Σ B(x)≥ 0.