Veranstaltung

Oberseminar
Weddle surfaces and 3-level moduli spaces of abelian surfaces
Michele Bolognesi
1.11.2005, 14:00 Uhr – 16:00 Uhr

It is well known that the threefold $\mathcal{B}\subset\mathbb{P}^4$ known as the Bürkhardt quartic is deeply related to moduli spaces of abelian surfaces with some 3-level structure, in particular to $\mathcal{A}_2(3)$ and $\mathcal{A}_2(3,6)$ . We show another such relation with $\mathcal{A}_2(3)^-$ , a moduli space that we introduce, parametrizing principally polarized abelian surfaces with a symmetric theta structure and the choice of an odd theta characteristic. We shall build the arithmetic group that defines $\mathcal{A}_2(3)^-$ as a quotient of the Siegel half-space and prove that it is birational to $\mathbb{P}^3$ thus giving a moduli interpretation to the classical unirationalization of $\B$ given by Weddle quartics. We also investigate the relation between these quartics, Kummer surfaces and the Igusa quartic.

Einzeltermin von:

Oberseminar: Algebraische Geometrie (Wintersemester 2005/06)

Verknüpft mit:

Michele Bolognesi

Veranstaltungen 2005