Realizing groups as symmetries of infinite translation surfaces

Abstract

We provide a complete classification of groups that can be realized as isometry groups of a translation surface M with non-finitely generated fundamental group and no planar ends. Furthermore, we demonstrate that if S has no non-displaceable subsurfaces and its space of ends is self-similar, then every countable subgroup of GL+(2,R) can be realized as the Veech group of a translation surface M homeomorphic to S. The latter result generalizes and improves upon the previous findings of Przytycki-Valdez-Weitze-Schmith\"usen and Maluendas-Valdez. To prove these results, we adapt ideas from the work of Aougab-Patel-Vlamis, which focused on hyperbolic surfaces, to translation surfaces.

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