Andrea Thevis
Published 2021-04-24Version 1
Veech groups are an important tool to examine translation surfaces and related mathematical objects. Origamis, also known as square-tiled surfaces, form an interesting class of translation surfaces with finite index subgroups of SL(2,Z) as Veech groups. We study when Veech groups of origamis with maximal symmetry group are totally non-congruence groups, i.e., when they surject onto SL(2, Z/nZ) for each natural number n. For this, we use a result of Schlage-Puchta and Weitze-Schmith\"usen to deduce sufficient conditions on the deck transformation group of the origami. More precisely, we show that origamis with certain quotients of triangle groups as deck transformation groups satisfy this condition. All Hurwitz groups are such quotients.
Comments: 6 pages, 2 figures, to be published in the proceedings of the 3rd BYMAT Conference 2020
The deficiency of being a congruence group for Veech groups of origamis
General origamis and Veech groups of flat surfaces
Lower bound for KVol on the minimal stratum of translation surfaces
![QR code for arXiv:2104.11938 [math.GT]](http://oss.arxitics.com/images/favicon.svg)