Qualitative analysis on the critical points of the Kirchhoff-Routh function

TL;DR

This paper analyzes the critical points of the Kirchhoff-Routh function in bounded domains, revealing how domain features like holes influence their number and location, and demonstrates the existence of multiple two-peak solutions in elliptic problems.

Contribution

It provides a detailed analysis of the critical points of the Kirchhoff-Routh function, especially in domains with small holes, and establishes the existence of multiple two-peak solutions.

Findings

Exact number and location of critical points for domains with small holes.

Nondegeneracy of critical points depending on hole location.

Existence of multiple two-peak solutions in elliptic problems.

Abstract

In this paper, we study the number of critical points of the Kirchhoff-Routh function \begin{equation*} \mathcal{KR}_D(x,y)=\Lambda_1^2\mathcal{R}_D(x)+\Lambda_2^2\mathcal{R}_D(y)-2\Lambda_1\Lambda_2G_D(x,y), \end{equation*} where $D$ is a bounded domain in $\mathbb{R}^2$, $x,y\in D$, $\Lambda_1,\Lambda_2>0$, $\mathcal{R}_D$ is the Robin function, and $G_D$ is the Green function of the operator $-\Delta$ with $0$ Dirichlet boundary condition on $D$. This function arises from concentration phenomena in nonlinear elliptic problems and from the de-singularization problem for the steady Euler equation. For domains with a small hole, we establish not only the exact number and the location of the critical points of $\mathcal{KR}_D$, but also their nondegeneracy. We show that the location of the hole plays a crucial role. Finally in the context of elliptic problems, we establish the existence of multiple two-peak solutions.