Long-time tails in the parabolic Anderson model with bounded potential
成果类型:
Article
署名作者:
Biskup, M; König, W
署名单位:
Microsoft; Technical University of Berlin
刊物名称:
ANNALS OF PROBABILITY
ISSN/ISSBN:
0091-1798
DOI:
10.1214/aop/1008956688
发表日期:
2001
页码:
636-682
关键词:
Asymptotics
intermittency
摘要:
We consider the parabolic Anderson problem partial derivative (t)u = kappa Deltau + xiu on (0, infinity) x Z(d) with random i.i.d. potential xi = (xi (z))(z is an element ofZ)(d) and the initial condition u(0, (.)) equivalent to 1. Our main assumption is that esssup xi (0) = 0. Depending on the thickness of the distribution Prob( xi (0) is an element of (.)) close to its essential supremum, we identify both the asymptotics of the moments of u(t, 0) and the almost-sure asymptotics of u(t, 0) as t --> infinity, in terms of variational problems. As a by-product, we establish Lifshitz tails for the random Schrodinger operator -kappa Delta - xi at the bottom of its spectrum. In our class of xi distributions, the Lifshitz exponent ranges from d /2 to infinity; the power law is typically accompanied by lower-order corrections.