Counting geodesics on expander surfaces
Abstract
We study properties of typical closed geodesics on expander surfaces of high genus, i.e. closed hyperbolic surfaces with a uniform spectral gap of the Laplacian. Under an additional systole lower bound assumption, we show almost every geodesic of length much greater than is non-simple. And we prove almost every closed geodesic of length much greater than is filling, i.e. each component of the complement of the geodesic is a topological disc. Our results apply to Weil-Petersson random surfaces, random covers of a fixed surface, and Brooks-Makover random surfaces, since these models are known to have uniform spectral gap asymptotically almost surely. Our proof technique involves adapting Margulis' counting strategy to work at low length scales.
Cite
@article{arxiv.2304.07938,
title = {Counting geodesics on expander surfaces},
author = {Benjamin Dozier and Jenya Sapir},
journal= {arXiv preprint arXiv:2304.07938},
year = {2026}
}
Comments
75 pages, 9 figures. Significant restructuring in response to referee reports; results unchanged. Organization and exposition improved, various minor mistakes corrected, proofs elaborated