On the conformal Ein invariants
Abstract
For a compact Riemannian -manifold of positive scalar curvature, the capital invariant of is defined to be the infinimum over of the quotient of the scalar curvature by the maximal eigenvalue of the Ricci curvature. This is a re-scale invariant and belongs to the interval . For a positive conformal class , we define the conformal invariant . In this paper, we prove vanihing theorems for Betti numbers and for the higher homotopy groups of under optimal lower bounds on assuming that is locally conformally flat. We establish an inequality relating our invariant to Schoen-Yau conformal invariant from which we deduce a classification result for locally conformally flat manifolds with higher . We show that the class of locally conformally flat manifolds with is stable under the operation of connected sums for \\ For a general positive conformal class, we prove in dimension an inequality relating to the first and second Yamabe invariants. Similar results are proved in this paper for an analogous conformal invariant, namely the small invariant.
Cite
@article{arxiv.2009.11601,
title = {On the conformal Ein invariants},
author = {Mohammed Larbi Labbi},
journal= {arXiv preprint arXiv:2009.11601},
year = {2022}
}
Comments
15 pages. Introduction and new results added, abstract rephrased, presentation improved and typos corrected