Unmarked simple length spectral rigidity for covers
Geometric Topology
2023-07-19 v2
Abstract
We prove that every closed orientable surface S of negative Euler characteristic admits a pair of finite-degree covers which are length isospectral over S but generically not simple length isospectral over S. To do this, we first characterize when two finite-degree covers of a connected, orientable surface of negative Euler characteristic are isomorphic in terms of which curves have simple elevations. We also construct hyperbolic surfaces X and Y with the same full unmarked length spectrum but so that for each k, the sets of lengths associated to curves with at most k self-intersections differ.
Cite
@article{arxiv.2210.16706,
title = {Unmarked simple length spectral rigidity for covers},
author = {Tarik Aougab and Max Lahn and Marissa Loving and Nicholas Miller},
journal= {arXiv preprint arXiv:2210.16706},
year = {2023}
}
Comments
33 pages, 8 figures; v2 contains only the non-effective portion of v1, the effective portion will appear in a separate posting