Qualitative analysis on the critical points of the Robin function

Francesca Gladiali, Massimo Grossi, Peng Luo, Shusen Yan

Published 2022-02-22Version 1

Let $\Omega\subset\mathbb{R}^N$ be a smooth bounded domain with $N\ge2$ and $\Omega_\epsilon=\Omega\backslash B(P,\epsilon)$ where $B(P,\epsilon)$ is the ball centered at $P\in\Omega$ and radius $\epsilon$. In this paper, we establish the number, location and non-degeneracy of critical points of the Robin function in $\Omega_\epsilon$ for $\epsilon$ small enough. We will show that the location of $P$ plays a crucial role on the existence and multiplicity of the critical points. The proof of our result is a consequence of delicate estimates on the Green function near to $\partial B(P,\epsilon)$. Some applications to compute the exact number of solutions of related well-studied nonlinear elliptic problems will be showed.