Structure theorem for compact Vaisman manifolds
Differential Geometry
2019-09-02 v2 Complex Variables
Abstract
A locally conformally Kaehler (l.c.K.) manifold is a complex manifold admitting a Kaehler covering , with each deck transformation acting by Kaehler homotheties. A compact l.c.K. manifold is Vaisman if it admits a holomorphic flow acting by non-trivial homotheties on . We prove a structure theorem for compact Vaisman manifolds. Every compact Vaisman manifold M is fibered over a circle, the fibers are Sasakian, the fibration is locally trivial, and M is reconstructed as a Riemannian suspension from the Sasakian structure on the fibers and the monodromy automorphism induced by this fibration. This construction is canonical and functorial in both directions.
Cite
@article{arxiv.math/0305259,
title = {Structure theorem for compact Vaisman manifolds},
author = {Liviu Ornea and Misha Verbitsky},
journal= {arXiv preprint arXiv:math/0305259},
year = {2019}
}
Comments
8 pages. Please see the errata in arXiv:1601.07413 (sections 1.3 and 3.2)