Quadruple covers and Gorenstein stable surfaces with K^2=1 and χ=2

Do, Anh Thi

Quadruple covers and Gorenstein stable surfaces with K^2=1 and χ=2

In this thesis we study Gorenstein stable surfaces with K 2X = 1 and \chi(\ko_X) = 2. These arise as quadruple covers of the projective plane and we give the precise relation between the structure of the cover and the canonical ring. We then use these results to study some strata of the moduli sp...

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Hlavní autor:	Do, Anh Thi
Další autoři:	Rollenske, Sönke (Prof. Dr.) (Vedoucí práce)
Médium:	Dissertation
Jazyk:	angličtina
Vydáno:	Philipps-Universität Marburg 2021
Témata:	Quadruple covers Algebraic geometry Gorenstein stable surfaces moduli space mathematics singularities Algebraic geometry semi-log-canonical sin Mathematik Vierfache verzweigte Überlagerungen Algebraische Geometrie Gorenstein stabile Flächen Modulraum Mathematik Singuläritäten Algebraische Geometrie Mathematics
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Popis
Shrnutí:	In this thesis we study Gorenstein stable surfaces with K 2X = 1 and \chi(\ko_X) = 2. These arise as quadruple covers of the projective plane and we give the precise relation between the structure of the cover and the canonical ring. We then use these results to study some strata of the moduli space \overline{\mathfrak{M}_1,2.
Fyzický popis:	85 Seiten
DOI:	10.17192/z2021.0299

Quadruple covers and Gorenstein stable surfaces with K^2=1 and χ=2

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