English

Spectral bounds for the torsion function

Spectral Theory 2017-03-31 v2 Analysis of PDEs

Abstract

Let Ω\Omega be an open set in Euclidean space Rm,m=2,3,...\R^m,\, m=2,3,..., and let vΩv_{\Omega} denote the torsion function for Ω\Omega. It is known that vΩv_{\Omega} is bounded if and only if the bottom of the spectrum of the Dirichlet Laplacian acting in \Leb2(Ω)\Leb^2(\Omega), denoted by λ(Ω)\lambda(\Omega), is bounded away from 00. It is shown that the previously obtained bound vΩ\Leb(Ω)λ(Ω)1\|v_{\Omega}\|_{\Leb^{\infty}(\Omega)}\lambda(\Omega)\ge 1 is sharp: for m{2,3,...}m\in\{2,3,...\}, and any ϵ>0\epsilon>0 we construct an open, bounded and connected set ΩϵRm\Omega_{\epsilon}\subset \R^m such that vΩϵ\Leb(Ωϵ)λ(Ωϵ)<1+ϵ\|v_{\Omega_{\epsilon}}\|_{\Leb^{\infty}(\Omega_{\epsilon})} \lambda(\Omega_{\epsilon})<1+\epsilon. An upper bound for vΩv_{\Omega} is obtained for planar, convex sets in Euclidean space M=R2M=\R^2, which is sharp in the limit of elongation. For a complete, non-compact, mm-dimensional Riemannian manifold MM with non-negative Ricci curvature, and without boundary it is shown that vΩv_{\Omega} is bounded if and only if the bottom of the spectrum of the Dirichlet-Laplace-Beltrami operator acting in \Leb2(Ω)\Leb^2(\Omega) is bounded away from 00.

Keywords

Cite

@article{arxiv.1701.02172,
  title  = {Spectral bounds for the torsion function},
  author = {Michiel van den Berg},
  journal= {arXiv preprint arXiv:1701.02172},
  year   = {2017}
}

Comments

13 pages, 1 figure

R2 v1 2026-06-22T17:44:44.848Z