English

Canonical translation surfaces for computing Veech groups

Geometric Topology 2021-08-26 v2 Dynamical Systems

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 (X,ω)(X, \omega) in the stratum, a matrix is in its Veech group SL(X,ω)\mathrm{SL}(X,\omega) 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 a2a\ge \sqrt{2} there is an explicit hyperbolic ball such that for any Fuchsian group trivially stabilizing ii, the Dirichlet domain centered at ii 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 aa. %When SL(X,ω)\mathrm{SL}(X,\omega) is a lattice we use this to give a condition guaranteeing that the full group SL(X,ω)\mathrm{SL}(X,\omega) has been computed. Together, these results give rise to a new algorithm for computing Veech groups.

Keywords

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

R2 v1 2026-06-23T21:15:27.555Z