Ergodic Transport Theory and Piecewise Analytic Subactions for Analytic Dynamics

Abstract

We consider a piecewise analytic real expanding map f: [0,1] [0,1] of degree d which preserves orientation, and a real analytic positive potential g: [0,1] R. We assume the map and the potential have a complex analytic extension to a neighborhood of the interval in the complex plane. We also assume g is well defined for this extension. It is known in Complex Dynamics that under the above hypothesis, for the given potential β \, g, where β is a real constant, there exists a real analytic eigenfunction φβ defined on [0,1] (with a complex analytic extension) for the Ruelle operator of β \, g. Under some assumptions we show that 1β\, φβ converges and is a piecewise analytic calibrated subaction. Our theory can be applied when g(x)=- f'(x). In that case we relate the involution kernel to the so called scaling function.