Fibred surfaces, varieties isogenous to a product and related moduli spaces
Bibliographic Information
- Published
- 2000-02
- DOI
-
- 10.1353/ajm.2000.0002
- Publisher
- Project MUSE
Description
<jats:p xml:lang="en"> A fibration of an algebraic surface S over a curve B , with fibres of genus at least 2, has constant moduli iff it is birational to the quotient of a product of curves by the action of a finite group G . A variety isogenous to a (higher) product is the quotient of a product of curves of genus at least 2 by the free action of a finite group. Theorem B gives a characterization of surfaces isogenous to a higher product in terms of the fundamental group and of the Euler number. Theorem C classifies the groups thus occurring and shows that, after fixing the group and the Euler number, one obtains an irreducible moduli space. The result of Theorem B is extended to higher dimension in Theorem G, thus generalizing (cf. also Theorem H) results of Jost-Yau and Mok concerning varieties whose universal cover is a polydisk. Theorem A shows that fibrations where the fibre genus and the genus of the base B are at least 2 are invariants of the oriented differentiable structure. The main Theorems D and E characterize surfaces carrying constant moduli fibrations as surfaces having a Zariski open set satisfying certain topological conditions (e.g., having the right Euler number, the right fundamental group and the right fundamental group at infinity).</jats:p>
Journal
-
- American Journal of Mathematics
-
American Journal of Mathematics 122 (1), 1-44, 2000-02
Project MUSE
- Tweet
Details 詳細情報について
-
- CRID
- 1362825895806420992
-
- ISSN
- 10806377
-
- Data Source
-
- Crossref