Self-Intersection Times for Random Walk, and Random Walk in Random Scenery in dimensions d>4

Abstract

We consider Random Walk in Random Scenery, denoted Xn, where the random walk is symmetric on Zd, with d>4, and the random field is made up of i.i.d random variables with a stretched exponential tail decay, with exponent α with 1<α. We present asymptotics for the probability, over both randomness, that \Xn>nβ\ for 1/2<β<1. To obtain such asymptotics, we establish large deviations estimates for the the self-intersection local times process.

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