The Obata first eigenvalue theorems on a seven dimensional quaternionic contact manifold
Differential Geometry
2022-07-20 v2 Analysis of PDEs
Abstract
We show that a compact quaternionic contact manifold of dimension seven that satisfies a Lichnerowicz-type lower Ricci-type bound and has the -function of any eigenfunction of the sub-Laplacian non-negative achieves its smallest possible eigenvalue only if the structure is qc-Einstein. In particular, under the stated conditions, the lowest eigenvalue is achieved if and only if the manifold is qc-equivalent to the standard -Sasakian sphere.
Keywords
Cite
@article{arxiv.2012.15767,
title = {The Obata first eigenvalue theorems on a seven dimensional quaternionic contact manifold},
author = {Abdelrahman Mohamed and Dimiter Vassilev},
journal= {arXiv preprint arXiv:2012.15767},
year = {2022}
}