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    • Veech Groups and Translation Coverings

    Myriam Finster

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    A translation surface is obtained by taking plane polygons and gluing their edges by translations. We ask which subgroups of the Veech group of a primitive translation surface can be realised via a translation covering. For many primitive surfaces we prove that partition stabilising congruence subgroups are the Veech group of a covering surface. We also address the coverings via their monodromy groups and present examples of cyclic coverings in short orbits, i.e. with large Veech groups.

    Umfang: X, 136 S.

    Preis: €37.00 | £34.00 | $65.00

    Fächer:

    Informatik und Mathematik 

    Schlagwörter:

    Veech group congruence subgroup monodromy group cyclic covering translation covering Veechgruppe Kongruenzgruppe Monodromiegruppe

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    Empfohlene Zitierweise
    Finster, M. 2014. Veech Groups and Translation Coverings. Karlsruhe: KIT Scientific Publishing. DOI: https://doi.org/10.5445/KSP/1000038927
    Finster, M., 2014. Veech Groups and Translation Coverings. Karlsruhe: KIT Scientific Publishing. DOI: https://doi.org/10.5445/KSP/1000038927
    Finster, M. Veech Groups and Translation Coverings. KIT Scientific Publishing, 2014. DOI: https://doi.org/10.5445/KSP/1000038927
    Finster, M. (2014). Veech Groups and Translation Coverings. Karlsruhe: KIT Scientific Publishing. DOI: https://doi.org/10.5445/KSP/1000038927
    Finster, Myriam. 2014. Veech Groups and Translation Coverings. Karlsruhe: KIT Scientific Publishing. DOI: https://doi.org/10.5445/KSP/1000038927



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    Weitere Informationen

    Veröffentlicht am 26. März 2014

    Sprache

    Englisch

    Seitenanzahl:

    150

    ISBN
    Paperback 978-3-7315-0180-0

    DOI
    https://doi.org/10.5445/KSP/1000038927