English

Rigidity results for the capillary overdetermined problem

Analysis of PDEs 2025-03-19 v1 Differential Geometry

Abstract

In this paper we obtain rigidity results for bounded positive solutions of the general capillary overdetermined problem \begin{equation} \left\{ \begin{array} {ll} \mathrm{div} \left(\frac{\nabla u}{\sqrt{1+|\nabla u|^2}}\right) + f(u) = 0 & \mbox{in }\; \Omega,\\[1mm] u= 0 & \mbox{on }\; \partial \Omega,\\[1mm] \partial_{\nu} u=\kappa &\mbox{on }\; \partial \Omega, \end{array}\right. \end{equation} where ff is a given C1C^1 function in R\mathbb{R}, ν\nu is the exterior unit normal, κ\kappa is a constant and ΩRn\Omega \subset \mathbb{R}^n is a C1C^1 domain. Our main theorem states that if n=2,κ0n=2, \kappa\neq 0, Ω\partial \Omega is unbounded and connected, u|\nabla u| is bounded and there exists a nonpositive primitive FF of ff such that F(0)(1+κ2)121F(0)\geq \left(1+\kappa^2\right)^{-\frac12} -1, then Ω\Omega must be a half-plane and uu is a parallel solution. In other words, under our assumptions, if a capillary graph has the property that its mean curvature depends only on the height, then it is the graph of a one dimensional function. We also prove the boundedness of the gradient of solutions of the above problem when f(u)<0f'(u) <0. Moreover we study a Modica type estimate for the above overdetermined problem that allows us to prove that, unless Ω\Omega is a half-space, the mean curvature of Ω\partial \Omega is strictly negative under the assumption that κ0\kappa\neq 0 and there exists a nonpositive primitive FF of ff such that F(0)(1+κ2)121F(0)\geq \left(1+\kappa^2\right)^{-\frac12} -1. Our results have an interesting physical application to the classical capillary overdetermined problem, i.e., the case where ff is linear.

Keywords

Cite

@article{arxiv.2503.14215,
  title  = {Rigidity results for the capillary overdetermined problem},
  author = {Yuanyuan Lian and Pieralberto Sicbaldi},
  journal= {arXiv preprint arXiv:2503.14215},
  year   = {2025}
}

Comments

42 pages

R2 v1 2026-06-28T22:25:13.105Z