Nullity conditions in paracontact geometry
Abstract
The paper is a complete study of paracontact metric manifolds for which the Reeb vector field of the underlying contact structure satisfies a nullity condition (the condition \eqref{paranullity} below, for some real numbers and ). This class of pseudo-Riemannian manifolds, which includes para-Sasakian manifolds, was recently defined in \cite{MOTE}. In this paper we show in fact that there is a kind of duality between those manifolds and contact metric -spaces. In particular, we prove that, under some natural assumption, any such paracontact metric manifold admits a compatible contact metric -structure (eventually Sasakian). Moreover, we prove that the nullity condition is invariant under -homothetic deformations and determines the whole curvature tensor field completely. Finally non-trivial examples in any dimension are presented and the many differences with the contact metric case, due to the non-positive definiteness of the metric, are discussed.
Cite
@article{arxiv.1209.0653,
title = {Nullity conditions in paracontact geometry},
author = {B. Cappelletti Montano and I. Kupeli Erken and C. Murathan},
journal= {arXiv preprint arXiv:1209.0653},
year = {2013}
}
Comments
Different. Geom. Appl. (to appear)