On the structure of co-K\"ahler manifolds

Abstract

By the work of Li, a compact co-K\"ahler manifold M is a mapping torus K, where K is a K\"ahler manifold and is a Hermitian isometry. We show here that there is always a finite cyclic cover M of the form M K × S1, where is equivariant diffeomorphism with respect to an action of S1 on M and the action of S1 on K × S1 by translation on the second factor. Furthermore, the covering transformations act diagonally on S1, K and are translations on the S1 factor. In this way, we see that, up to a finite cover, all compact co-K\"ahler manifolds arise as the product of a K\"ahler manifold and a circle.