Compound Poisson law for hitting times to periodic orbits in two-dimensional hyperbolic systems

Abstract

We show that a compound Poisson distribution holds for scaled exceedances of observables φ uniquely maximized at a periodic point ζ in a variety of two-dimensional hyperbolic dynamical systems with singularities (M,T,μ), including the billiard maps of Sinai dispersing billiards in both the finite and infinite horizon case. The observable we consider is of form φ (z)=- d(z,ζ) where d is a metric defined in terms of the stable and unstable foliation. The compound Poisson process we obtain is a P\'olya-Aeppli distibution of index θ. We calculate θ in terms of the derivative of the map T. Furthermore if we define Mn=\φ,…,φ Tn\ and un (τ) by n ∞ nμ (φ >un (τ) )=τ the maximal process satisfies an extreme value law of form μ (Mn un)=e-θ τ. These results generalize to a broader class of functions maximized at ζ, though the formulas regarding the parameters in the distribution need to be modified.