Bifurcating domains for an overdetermined eigenvalue problem in cylinders
Analysis of PDEs
2025-12-19 v1
Abstract
We study an overdetermined eigenvalue problem for domains contained in the half-cylinder , based on a bounded regular domain . It is easy to see that in any bounded cylinder , , the eigenvalue problem admits a one-dimensional positive eigenfunction which satisfies the overdetermined boundary conditions. The aim of the paper is to construct other domains for which there exists a positive eigenfunction that is a solution of the overdetermined problem. This is achieved by showing that branches of such domains bifurcate from the ``trivial'' domains at the values where () is a simple Neumann eigenvalue of the Laplace operator on . The solutions can be reflected with respect to to generate nontrivial solutions in a cylinder.
Cite
@article{arxiv.2512.16319,
title = {Bifurcating domains for an overdetermined eigenvalue problem in cylinders},
author = {Yuanyuan Lian and Filomena Pacella and Pieralberto Sicbaldi},
journal= {arXiv preprint arXiv:2512.16319},
year = {2025}
}