The type problem for Riemann surfaces via Fenchel-Nielsen parameters

TL;DR

This paper establishes criteria for determining when a Riemann surface is of parabolic type using Fenchel-Nielsen parameters, highlighting the influence of twist parameters and introducing non standard half-collars.

Contribution

It provides new conditions linking Fenchel-Nielsen parameters to parabolicity, including the effect of twist parameters and the concept of non standard half-collars.

Findings

Parabolicity characterized by length parameters in specific cases.

Twist parameters significantly influence parabolicity.

Complete characterization of parabolicity for certain flute surfaces.

Abstract

A Riemann surface $X$ is said to be of \emph{parabolic type} if it supports a Green's function. Equivalently, the geodesic flow on the unit tangent of $X$ is ergodic. Given a Riemann surface $X$ of arbitrary topological type and a hyperbolic pants decomposition of $X$ we obtain sufficient conditions for parabolicity of $X$ in terms of the Fenchel-Nielsen parameters of the decomposition. In particular, we initiate the study of the effect of twist parameters on parabolicity. A key ingredient in our work is the notion of \textit{non standard half-collar} about a hyperbolic geodesic. We show that the modulus of such a half-collar is much larger than the modulus of a standard half-collar as the hyperbolic length of the core geodesic tends to infinity. Moreover, the modulus of the annulus obtained by gluing two non standard half-collars depends on the twist parameter, unlike in the case of standard collars. Our results are sharp in many cases. For instance, for zero-twist flute surfaces as well as half-twist flute surfaces with concave sequences of lengths our results provide a complete characterization of parabolicity in terms of the length parameters. It follows that parabolicity is equivalent to completeness in these cases. Applications to other topological types such as surfaces with infinite genus and one end (a.k.a. the infinite Loch-Ness monster), the ladder surface, Abelian covers of compact surfaces are also studied.