Eckart Viehweg, Kang Zuo
Published 2002-04-22, updated 2002-07-25Version 2
Let f:X-->Y be a semi-stable family of complex abelian varieties over a curve Y of genus q, and smooth over the complement of s points. If F(1,0) denotes the non-flat (1,0) part of the corresponding variation of Hodge structures, the Arakelov inequalities say that 2deg(F(1,0)) is bounded from above by g=rank(F(1,0))(2q-2+s). We show that for s>0 families reaching this bound are isogenous to the g-fold product of a modular family of elliptic curves, and a constant abelian variety. The content of this note became part of the article "A characterization of certain Shimura curves in the moduly stack of abelian varieties" (math.AG/0207228), where we also handle the case s=0.
Comments: 13 pages, Latex, two minor errors corrected, the content of this note became part of math.AG/0207228
A characterization of certain Shimura curves in the moduli stack of abelian varieties
Uniformization of $p$-adic curves via Higgs-de Rham flows
On Shimura curves generated by families of Galois $G$-covers of curves
![QR code for arXiv:math/0204261 [math.AG]](http://oss.arxitics.com/images/favicon.svg)