Extremal dichotomy for uniformly hyperbolic systems

Abstract

We consider the extreme value theory of a hyperbolic toral automorphism T: T2 T2 showing that if a H\"older observation φ which is a function of a Euclidean-type distance to a non-periodic point ζ is strictly maximized at ζ then the corresponding time series \φ Ti\ exhibits extreme value statistics corresponding to an iid sequence of random variables with the same distribution function as φ and with extremal index one. If however φ is strictly maximized at a periodic point q then the corresponding time-series exhibits extreme value statistics corresponding to an iid sequence of random variables with the same distribution function as φ but with extremal index not equal to one. We give a formula for the extremal index (which depends upon the metric used and the period of q). These results imply that return times are Poisson to small balls centered at non-periodic points and compound Poisson for small balls centered at periodic points.