English

Type problem, the first eigenvalue and Hardy inequalities

Differential Geometry 2024-03-29 v1 Analysis of PDEs

Abstract

In this paper, we study the relationship between the type problem and the asymptotic behaviour of the first (Dirichlet) eigenvalues λ1(Br)\lambda_1(B_r) of ``balls'' Br:={ρ<r}B_r:=\{\rho<r\} on a complete Riemannian manifold MM as r+r\rightarrow +\infty, where ρ\rho is a Lipschitz continuous exhaustion function with ρ1|\nabla\rho|\leq1 a.e. on MM. We obtain several sharp results. First, if for all r>r0r>r_0 r2λ1(Br)γ>0, r^2 \lambda_1(B_r)\ge \gamma>0, we obtain a sharp estimate of the volume growth: Brcrμ(γ).|B_r|\ge cr^{\mu(\gamma)}. Moreover when γ>j025.784\gamma>j_0^2\approx 5.784, where j0j_0 denotes the first positive zero of the Bessel function J0J_0, then MM is hyperbolic and we have a Hardy type inequality. In the case where r0=0r_0=0, a sharp Hardy type inequality holds. These spectral conditions are satisfied if one assumes that Δρ22μ(γ)>0\Delta\rho^2\geq2\mu(\gamma)>0. In particular, when infMΔρ2>4\inf_M\Delta\rho^2>4, MM is hyperbolic and we get a sharp Hardy type inequality. Related results for finite volume case are also studied.

Keywords

Cite

@article{arxiv.2403.19086,
  title  = {Type problem, the first eigenvalue and Hardy inequalities},
  author = {Gilles Carron and Bo-Yong Chen and Yuanpu Xiong},
  journal= {arXiv preprint arXiv:2403.19086},
  year   = {2024}
}

Comments

20 pages. Comments are welcome! arXiv admin note: text overlap with arXiv:2401.11803

R2 v1 2026-06-28T15:36:32.435Z