Flat trace statistics of the transfer operator of a random partially expanding map

Abstract

We consider the skew-product of an expanding map E on the circle T with an almost surely Ck random perturbation τ=τ0+δτ of a deterministic function τ0: \[F :\arrayrcl T × R & & T × R\\ (x,y)& & (E(x), y+τ(x))\\ array .\] The associated transfer operator L:u ∈ Ck ( T × R) u F can be decomposed with respect to frequency in the y variable into a family of operators acting on functions on the circle: \[ L :\arrayrcl Ck( T) & & Ck( T)\\ u & & eiτu E \\ array .\] We show that the flat traces of Ln behave as normal distributions in the semiclassical limit n, ∞ up to the Ehrenfest time n≤ ck.