Type problem, the first eigenvalue and Hardy inequalities

Abstract

In this paper, we study the relationship between the type problem and the asymptotic behaviour of the first (Dirichlet) eigenvalues λ1(Br) of ``balls'' Br:=\<r\ on a complete Riemannian manifold M as r→ +∞, where is a Lipschitz continuous exhaustion function with |∇|≤1 a.e. on M. We obtain several sharp results. First, if for all r>r0 \[ r2 λ1(Br) γ>0, \] we obtain a sharp estimate of the volume growth: |Br| crμ(γ). Moreover when γ>j02≈ 5.784, where j0 denotes the first positive zero of the Bessel function J0, then M is hyperbolic and we have a Hardy type inequality. In the case where r0=0, a sharp Hardy type inequality holds. These spectral conditions are satisfied if one assumes that 2≥2μ(γ)>0. In particular, when ∈fM2>4, M is hyperbolic and we get a sharp Hardy type inequality. Related results for finite volume case are also studied.