Kazuhiko Yamaki
Published 2014-05-05, updated 2014-12-21Version 2
We prove that the geometric Bogomolov conjecture for any abelian varieties is reduced to that for nowhere degenerate abelian varieties with trivial trace. In particular, the geometric Bogomolov conjecture holds for abelian varieties whose maximal nowhere degenerate abelian subvariety is isogenous to a constant abelian variety. To prove the results, we investigate closed subvarieties of abelian schemes over constant varieties, where constant varieties are varieties over a function field which can be defined over the constant field of the function field.
Comments: 27 pages. There is an appendix added, which is used in the proof of Proposition 4.6. There was an error in Lemma 4.7, which has been resolved in this revision
Geometric Bogomolov conjecture for nowhere degenerate abelian varieties of dimension $5$ with trivial trace
The Maillot-Rössler current and the polylogarithm on abelian schemes
Local to global principles for homomorphisms of abelian schemes
![QR code for arXiv:1405.0896 [math.AG]](http://oss.arxitics.com/images/favicon.svg)