Subcritical nonlocal problems with mixed boundary conditions

TL;DR

This paper proves the existence of multiple solutions for a fractional Laplacian problem with mixed boundary conditions using variational and topological methods, expanding understanding of nonlocal PDEs with complex boundary setups.

Contribution

It introduces new existence results for solutions to nonlocal fractional problems with mixed boundary conditions, employing linking and $ abla$-theorems.

Findings

Multiple solutions are proven to exist for the problem.

The methods extend to spectral fractional Laplacian with mixed boundary data.

Results contribute to the theory of nonlocal PDEs with complex boundary conditions.

Abstract

In this paper, by variational and topological arguments based on linking and $\nabla$-theorems, we prove the existence of multiple solutions for the following nonlocal problem with mixed Dirichlet-Neumann boundary data, $$ \left\{ \begin{array}{lcl} (-\Delta)^su=\lambda u+f(x,u) & &\text{in } \Omega, \\[2pt] \mkern+39mu u=0& &\text{on } \Sigma_{\mathcal{D}}, \\[2pt] \mkern+26mu \displaystyle \frac{\partial u}{\partial \nu}=0& &\text{on } \Sigma_{\mathcal{N}}, \end{array} \right. $$ where $(-\Delta)^s$, $s\in (1/2,1)$, is the spectral fractional Laplacian operator, $\Omega\subset\mathbb{R}^N$, $N>2s$, is a smooth bounded domain, $\lambda>0$ is a real parameter, $\nu$ is the outward normal to $\partial\Omega$, $\Sigma_{\mathcal{D}}$, $\Sigma_{\mathcal{N}}$ are smooth $(N-1)$-dimensional submanifolds of $\partial\Omega$ such that $\Sigma_{\mathcal{D}}\cup\Sigma_{\mathcal{N}}=\partial\Omega$, $\Sigma_{\mathcal{D}}\cap\Sigma_{\mathcal{N}}=\emptyset$ and $\Sigma_{\mathcal{D}}\cap\overline{\Sigma}_{\mathcal{N}}=\Gamma$ is a smooth $(N-2)$-dimensional submanifold of $\partial\Omega$.