Serrin's overdetermined problems on epigraphs
Abstract
In this work we establish some rigidity results for Serrin's overdetermined problem \begin{equation*} \left\{ \begin{array}{cll} - \Delta u=f(u) & \text{in}& \Omega,\newline u > 0& \text{in} & \Omega,\newline u=0 & \text{on} & \partial \Omega,\newline \dfrac{\partial u}{\partial \eta} = \mathfrak{c} = const. & \text{on} & \partial \Omega, \end{array} \right. \end{equation*} when is an epigraph (not necessarily globally Lipschitz-continuous) and is a classical solution, possibly unbounded. In broad terms, our main results prove that must be an affine half-space and must be one-dimensional, provided the epigraph is bounded from below. These results hold when is of Allen-Cahn type and or, alternatively, when is locally Lipschitz-continuous (with no restriction on the sign of ) and . These results partially answer a question raised by Berestycki, Caffarelli and Nirenberg in [1]. Finally, when , we also prove a new monotonicity result, valid in any dimension .
Cite
@article{arxiv.2502.04812,
title = {Serrin's overdetermined problems on epigraphs},
author = {Nicolas Beuvin and Alberto Farina},
journal= {arXiv preprint arXiv:2502.04812},
year = {2025}
}