English

Inequalities between Dirichlet and Neumann Eigenvalues on Surfaces

Differential Geometry 2025-06-04 v2 Analysis of PDEs Spectral Theory

Abstract

For a bounded Lipschitz domain Σ\Sigma in a Riemannian surface MM satisfying certain curvature condition, we prove that μ3β1λ1,\mu_{3-\beta_1} \leq \lambda_{1}, where μk\mu_k (λk\lambda_k resp.) is the kk-th Neumann (Dirichlet resp.) Laplacian eigenvalue on Σ\Sigma and β1\beta_1 is the first Betti number of Σ.\Sigma. If Σ\Sigma is smooth and simply connected, we can further derive the strict inequality μ3<λ1. \mu_{3}< \lambda_{1}. This extends previous results on the Euclidean space to various curved surfaces, including the flat cylinder, the hyperbolic plane, hyperbolic cusp, collar, funnel, and minimal surfaces such as catenoid and helicoid. The novelty of the paper lies in comparing Dirichlet and Neumann Laplacian eigenvalues via the variational principle of the Hodge Laplacian on 11-forms on a surface, extending the variational principle on vector fields in the Euclidean plane as developed by Rohleder. The comparison is reduced to the existence of a distance function with appropriate curvature conditions on its level sets.

Keywords

Cite

@article{arxiv.2412.19480,
  title  = {Inequalities between Dirichlet and Neumann Eigenvalues on Surfaces},
  author = {Bobo Hua and Florentin Münch and Haohang Zhang},
  journal= {arXiv preprint arXiv:2412.19480},
  year   = {2025}
}
R2 v1 2026-06-28T20:49:38.902Z