Generalized complex structure on certain principal torus bundles
Abstract
A principal torus bundle over a complex manifold with even dimensional fiber and characteristic class of type admits a family of regular generalized complex structures (GCS) with the fibers as leaves of the associated symplectic foliation. We show that such a generalized complex structure is equivalent to the product of the complex structure on the base and the symplectic structure on the fiber in a tubular neighborhood of an arbitrary fiber if and only if the bundle is flat. This has consequences for the generalized Dolbeault cohomology of the bundle that includes a K\"{u}nneth formula. On a more general note, if a principal bundle over a complex manifold with a symplectic structure group admits a GCS with the fibers of the bundle as leaves of the associated symplectic foliation, and the GCS is equivalent to a product GCS in a neighborhood of every fiber, then the bundle is flat and symplectic.
Keywords
Cite
@article{arxiv.2303.07835,
title = {Generalized complex structure on certain principal torus bundles},
author = {Debjit Pal and Mainak Poddar},
journal= {arXiv preprint arXiv:2303.07835},
year = {2024}
}
Comments
26 pages, significant changes to earlier version, main theorems have been revised