Curvature operator and Euler number
Abstract
Let be a compact -dimensional smooth Riemannian manifold with a lower bound on the average of the lowest eigenvalues of the curvature operator and the diameter of is bounded above by . In this article, we investigate the relationship between the curvature operator and the Euler number of . Our analysis is based on more general vanishing theorems for a Dirac operator associated with a smooth -form on . As a consequence, we obtain partial affirmative answers to Question 4.6 posed by Herrmann, Sebastian, and Tuschmann in \cite{HST}. Specifically, we prove that if a compact -dimensional manifold admits an almost nonnegative curvature operator (ANCO) and has a nontrivial first de Rham cohomology group, then its Euler number vanishes. Furthermore, in the case where , we show that the Euler number is nonnegative. This result provides a complete resolution to their question in the four-dimensional setting.
Cite
@article{arxiv.2507.22091,
title = {Curvature operator and Euler number},
author = {Huang Teng and Tan Qiang},
journal= {arXiv preprint arXiv:2507.22091},
year = {2025}
}
Comments
Appeared in Calc. Var. Note that references [1] and [2] in the published version of the journal were not actually cited in the original text