The lower bound of first Dirichlet eigenvalue of p-Laplacian in Riemannian manifolds

This paper investigates the first Dirichlet eigenvalue of bounded domains for the p-Laplacian in complete Riemannian manifolds. Firstly, we establish a lower bound for this eigenvalue under the condition that the domain includes a specific function which fulfills certain criteria related to divergence and gradient conditions. As an application, we show that p (₁, ₏) ^1/p is an increasing function about p. We further explore Barta's inequality and other relevant applications stemming from this foundational result. In the subsequent section, we introduce an enhanced lower bound for the eigenvalue, which is linked to the distance function defined in the domain. As a practical application, we provide an estimation for the first Dirichlet eigenvalue of geodesic balls with large radius in asymptotically hyperbolic Einstein manifolds.