Existence of solutions on the critical hyperbola for a pure Lane-Emden system with Neumann boundary conditions

TL;DR

This paper proves the existence of least-energy solutions for a critical Lane-Emden system with Neumann boundary conditions in bounded domains, using a dual variational approach and establishing new compactness criteria.

Contribution

It introduces a dual variational formulation for the critical hyperbola case and proves existence of classical solutions, including for the biharmonic reduction when p=1.

Findings

Existence of least-energy solutions under critical hyperbola conditions

Development of a new Cherrier type inequality for compactness

Partial symmetry and symmetry-breaking results in symmetric domains

Abstract

We study the following Lane-Emden system \[ -\Delta u=|v|^{q-1}v \quad \text{ in } \Omega, \qquad -\Delta v=|u|^{p-1}u \quad \text{ in } \Omega, \qquad u_\nu=v_\nu=0 \quad \text{ on } \partial \Omega, \] with $\Omega$ a bounded regular domain of $\mathbb{R}^N$, $N \ge 4$, and exponents $p, q$ belonging to the so-called critical hyperbola $1/(p+1)+1/(q+1)=(N-2)/N$. We show that, under suitable conditions on $p, q$, least-energy (sign-changing) solutions exist, and they are classical. In the proof we exploit a dual variational formulation which allows to deal with the strong indefinite character of the problem. We establish a compactness condition which is based on a new Cherrier type inequality. We then prove such condition by using as test functions the solutions to the system in the whole space and performing delicate asymptotic estimates. If $N \ge 5$, $p=1$, the system above reduces to a biharmonic equation, for which we also prove existence of least-energy solutions. Finally, we prove some partial symmetry and symmetry-breaking results in the case $\Omega$ is a ball or an annulus.