Return times at periodic points in random dynamics

Abstract

We prove a quenched limiting law for random measures on subshifts at periodic points. We consider a family of measures \μω\ω∈, where the `driving space' is equipped with a probability measure which is invariant under a transformation θ. We assume that the fibred measures μω satisfy a generalised invariance property and are -mixing. We then show that for almost every ω the return times to cylinders An at periodic points are in the limit compound Poisson distributed for a parameter which is given by the escape rate at the periodic point.