Abstract
We call a group G very Jordan if it contains a normal abelian subgroup G such that the orders of finite subgroups of the quotient G/ G are bounded by a constant depending on G only. Let Y be a complex torus of algebraic dimension 0. We prove that if X is a non-trivial holomorphic P1-bundle over Y then the group Bim (X) of its bimeromorphic automorphisms is very Jordan (contrary to the case when Y has positive algebraic dimension). This assertion remains true if Y is any connected compact complex Kähler manifold of algebraic dimension 0 without rational curves or analytic subsets of codimension 1.
| Original language | English |
|---|---|
| Pages (from-to) | 641-670 |
| Number of pages | 30 |
| Journal | European Journal of Mathematics |
| Volume | 7 |
| Issue number | 2 |
| DOIs | |
| State | Published - Jun 2021 |
Bibliographical note
Publisher Copyright:© 2020, Springer Nature Switzerland AG.
Funding
The second named author (Yu.Z.) was partially supported by Simons Foundation Collaboration Grant # 585711.
| Funders | Funder number |
|---|---|
| Simons Foundation Collaboration | 585711 |
Keywords
- Algebraic dimension 0
- Automorphism groups of compact complex manifolds
- Complex tori
- Conic bundles
- Jordan properties of groups