Dissipation and high disorder

Abstract

Given a field \B(x)\x∈Zd of independent standard Brownian motions, indexed by Zd, the generator of a suitable Markov process on Zd,\,\,G, and sufficiently nice function σ:[0,∞)[0,∞), we consider the influence of the parameter λ on the behavior of the system, align* d ut(x) = & (Gut)(x)\,d t + λσ(ut(x))d Bt(x) [t>0,\ x∈Zd], &u0(x)=c0δ0(x). align* We show that for any λ>0 in dimensions one and two the total mass Σx∈Zdut(x) 0 as t∞ while for dimensions greater than two there is a phase transition point λc∈(0,∞) such that for λ>λc,\, ΣZdut(x) 0 as t∞ while for λ<λc,\,ΣZdut(x) 0 as t∞.