Vassil Kanev
Published 2003-08-01Version 1
We prove that the moduli space A_3(1,1,4) of polarized abelian threefolds with polarization of type (1,1,4) is unirational. By a result of Birkenhake and Lange this implies the unirationality of the isomorphic moduli space A_3(1,4,4). The result is based on the study the Hurwitz space H_{4,n}(Y) of quadruple coverings of an elliptic curve Y simply branched in n points. We prove the unirationality of its codimension one subvariety H^{0}_{4,A}(Y) which parametrizes quadruple coverings \pi:X --> Y with Tschirnhausen modules isomorphic to A^{-1}, where A\in Pic^{n/2}Y, and for which \pi^*:J(Y)--> J(X) is injective. This is an analog of the result of Arbarello and Cornalba that the Hurwitz space H_{4,n}(P^1) is unirational.
Comments: 28 pages, amslatex, to appear in Mathematische Nachrichten
Journal: Math. Nachr. Vol. 278 (2005), pp. 154 - 172.
Hurwitz spaces of triple coverings of elliptic curves and moduli spaces of abelian threefolds
Semistable fibrations over an elliptic curve with only one singular fibre
The Hurwitz space of covers of an elliptic curve $E$ and the Severi variety of curves in $E \times \mathbb{P}^1$
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