Numerically flat foliations and holomorphic Poisson geometry
Abstract
We investigate the structure of smooth holomorphic foliations with numerically flat tangent bundles on compact K\"ahler manifolds. Extending earlier results on non-uniruled projective manifolds by the second and fourth authors, we show that such foliations induce a decomposition of the tangent bundle of the ambient manifold, have leaves uniformized by Euclidean spaces, and have torsion canonical bundle. Additionally, we prove that smooth two-dimensional foliations with numerically trivial canonical bundle on projective manifolds are either isotrivial fibrations or have numerically flat tangent bundles. This in turn implies a global Weinstein splitting theorem for rank-two Poisson structures on projective manifolds. We also derive new Hodge-theoretic conditions for the existence of zeros of Poisson structures on compact K\"ahler manifolds.
Cite
@article{arxiv.2411.08806,
title = {Numerically flat foliations and holomorphic Poisson geometry},
author = {Stéphane Druel and Jorge Vitório Pereira and Brent Pym and Frédéric Touzet},
journal= {arXiv preprint arXiv:2411.08806},
year = {2024}
}
Comments
To Jean-Pierre Demailly, in memoriam. 27 pages, comments welcome