Gorenstein stable surfaces satisfying K_X^2 = 2 and χ(O_X)=4

Gorenstein stable surfaces satisfying K_X^2 = 2 and χ(O_X)=4

We define and study a concrete stratification of the moduli space of Gorenstein stable surfaces X satisfying K_X^2 = 2 and χ(O_X ) = 4, by first establishing an isomorphism with the moduli space of plane octics with certain singularities, which is then easier to handle concretely. In total, there a...

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Opis bibliograficzny
1. autor: Anthes, Ben
Kolejni autorzy: Rollenske, Sönke (Prof. Dr.) (Promotor doktoranta)
Format: Dissertation
Język:angielski
Wydane: Philipps-Universität Marburg 2018
Hasła przedmiotowe:
semi log canonical singularities
stable surfaces
Algebraische Flächen vom allgemeinen typ
Mathematik
Algebraic surfaces
Gorenstein Singularitäten
Algebraic surfaces of general type
Ebene Kurve
Gorenstein singularities
stabile Flächen
Algebraische Fläche
moduli spaces
Modulraum
Algebraische Geometrie
semi-log-kanonische Singularitäten
Algebraische Flächen
Mathematics
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Opis
Streszczenie:We define and study a concrete stratification of the moduli space of Gorenstein stable surfaces X satisfying K_X^2 = 2 and χ(O_X ) = 4, by first establishing an isomorphism with the moduli space of plane octics with certain singularities, which is then easier to handle concretely. In total, there are 47 inhabited strata with altogether 78 components.
Opis fizyczny:100 Seiten
DOI:10.17192/z2019.0050

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