An extension of ergodic theory for Gauss-type maps

Abstract

We propose an extension of ergodic theory which focuses on the identification of ergodicity in terms of the uniqueness of the invariant measure. We first explain the concept for the doubling maps, which can be analyzed using Fourier methods. We then proceed to the Gauss-type maps of interest, of the form x -β/x mod 2 Z on the symmetric interval [-1,1], for 0<β1. We study an extended state space on the interval, formed as the restriction to the interval [-1,1] of functions of the form f+Hg, where f and g are L1-functions. We then look for invariant states for the Gauss-type map. We find that the standard ergodicity results available for L1 extend with difficulty to the larger state space. The machinery developed involves a dynamical decomposition of the odd part of the Hilbert kernel. We apply the result to decide the issue when the nonnegative integer powers of two given atomic singular inner functions is complete in H∞ with respect to the weak-star topology.