Splitting a manifold with (spectral) Ricci lower bounds

Seminar: 
Geometric Analysis and Application
Event time: 
Monday, February 23, 2026 - 3:45pm
Location: 
Speaker: 
Gioacchino Antonelli
Speaker affiliation: 
University of Notre Dame
Event description: 

In this talk, I will discuss the geometry of smooth complete manifolds where the first eigenvalue of the operator −γΔ + Ric, for γ > 0, is bounded from below. Here, Ric denotes the (pointwise) lowest eigenvalue of the Ricci tensor. This condition is weaker than a pointwise lower bound on Ricci curvature. In particular, I will focus on the following result. Let (Mⁿ,g) be a complete non-compact Riemannian manifold with at least two ends, and with n≥2. Assume u is a positive function on M satisfying −γΔu+Ric*u≥0 and γ<4/(n-1). Then, Mⁿ is isometric to the product of IR x Nⁿ⁻¹. This extends a result of Cheeger–Gromoll from 1971, and the bound required on γ is sharp. Joint work with M. Pozzetta and K. Xu.

https://yale.zoom.us/j/91979343134