Abstract
AbstractIn this paper, we develop the mathematical tools needed to explore isotopy classes of tilings on hyperbolic surfaces of finite genus, possibly nonorientable, with boundary, and punctured. More specifically, we generalize results on Delaney–Dress combinatorial tiling theory using an extension of mapping class groups to orbifolds, in turn using this to study tilings of covering spaces of orbifolds. Moreover, we study finite subgroups of these mapping class groups. Our results can be used to extend the Delaney–Dress combinatorial encoding of a tiling to yield a finite symbol encoding the complexity of an isotopy class of tilings. The results of this paper provide the basis for a complete and unambiguous enumeration of isotopically distinct tilings of hyperbolic surfaces.
Funder
Deutsche Forschungsgemeinschaft
Publisher
Springer Science and Business Media LLC
Reference67 articles.
1. Abikoff, W.: The real analytic theory of Teichmüller space, 820 (1980)
2. Adem, A., Theory, C., Morava, J., Ruan, Y.: Orbifolds in Mathematics and Physics: Proceedings of a Conference on Mathematical Aspects of Orbifold String Theory. Contemporary mathematics—American Mathematical Society, American Mathematical Society (2002)
3. Bers, L.: Quasiconformal mappings and Teichmüller’s theorem. Princet. Math. Ser. 24, 18–23 (1960)
4. Birman, J.S., Hilden, M.H.: Lifting and projecting homeomorphisms. Arch. Math. 23, 428–434 (1972)
5. Birman, J.S., Hilden, H.M.: On isotopies of homeomorphisms of Riemann surfaces. Ann. Math. 97(3), 424–439 (1973)
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