Inner Functions and Laminations
Dynamical Systems
2024-05-07 v1 Complex Variables
Abstract
In this paper, we study orbit counting problems for inner functions using geodesic and horocyclic flows on Riemann surface laminations. For a one component inner function of finite Lyapunov exponent with , other than , we show that the number of pre-images of a point that lie in a ball of hyperbolic radius centered at the origin satisfies For a general inner function of finite Lyapunov exponent, we show that the above formula holds up to a Ces\`aro average. Our main insight is that iteration along almost every inverse orbit is asymptotically linear. We also prove analogues of these results for parabolic inner functions of infinite height.
Cite
@article{arxiv.2405.02878,
title = {Inner Functions and Laminations},
author = {Oleg Ivrii and Mariusz Urbański},
journal= {arXiv preprint arXiv:2405.02878},
year = {2024}
}
Comments
75 pages, 2 figures