Principal p-frequency estimates on non-compact manifolds with negative Ricci curvature

Abstract

We establish a lower bound for the principal p-frequency λ1,p() on a bounded domain in a non-compact Riemannian manifold of dimension n. Under the assumption that the Ricci curvature satisfies Ric ≥ (n-1)K with K<0, we prove that λ1,p() > λD,K,n, where D is the diameter of and λD,K,n is explicitly defined as the first eigenvalue of an associated one-dimensional ordinary differential equation model that incorporates both D and K. Moreover, the estimate is sharp. This work extends previous results for the case K=0 to the geometrically more complex setting of negative Ricci curvature, and providing a new quantitative connection between the eigenvalue, the diameter of domains, and the curvature lower bound.