Canonical translation surfaces for computing Veech groups
Abstract
For each stratum of the space of translation surfaces, we introduce an infinite translation surface containing in an appropriate manner a copy of every translation surface of the stratum. Given a translation surface in the stratum, a matrix is in its Veech group if and only if an associated affine automorphism of the infinite surface sends each of a finite set, the ``marked" {\em Voronoi staples}, arising from orientation-paired segments appropriately perpendicular to Voronoi 1-cells, to another pair of orientation-paired ``marked" segments. We prove a result of independent interest. For each real there is an explicit hyperbolic ball such that for any Fuchsian group trivially stabilizing , the Dirichlet domain centered at of the group already agrees within the ball with the intersection of the hyperbolic half-planes determined by the group elements whose Frobenius norm is at most . %When is a lattice we use this to give a condition guaranteeing that the full group has been computed. Together, these results give rise to a new algorithm for computing Veech groups.
Cite
@article{arxiv.2012.12444,
title = {Canonical translation surfaces for computing Veech groups},
author = {Brandon Edwards and Slade Sanderson and Thomas A. Schmidt},
journal= {arXiv preprint arXiv:2012.12444},
year = {2021}
}
Comments
20 pages, 8 figures. New version has more appropriate title, and minor editing