Positive toric fibrations
Abstract
A principal toric bundle is a complex manifold equipped with a free holomorphic action of a compact complex torus . Such a manifold is fibered over , with fiber . We discuss the notion of positivity in fiber bundles and define positive toric bundles. Given an irreducible complex subvariety of a positive principal toric bundle, we show that either is -invariant, or it lies in an orbit of -action. For principal elliptic bundles, this theorem is known (math.AG/0403430). As follows from Borel-Remmert-Tits theorem, any compact simply connected homogeneous complex manifold is a principal toric bundle. We show that compact Lie groups with left-invariant complex structure are positive toric bundles, if is generic. Other examples of positive toric bundles are discussed.
Cite
@article{arxiv.math/0703162,
title = {Positive toric fibrations},
author = {Misha Verbitsky},
journal= {arXiv preprint arXiv:math/0703162},
year = {2014}
}
Comments
21 pages, v3. The proof simplified, introduction added