On an eigenvalue problem associated with mixed operators under mixed boundary conditions
Abstract
In this paper, we study a class of eigenvalue problems involving both local as well as nonlocal operators, precisely the classical Laplace operator and the fractional Laplace operator in the presence of mixed boundary conditions, that is \begin{equation} \label{1} \left\{\begin{split} \mathcal{L}u\: &= \lambda u,~~u>0~ \text{in} ~\Omega, u&=0~~\text{in} ~~{U^c}, \mathcal{N}_s(u)&=0 ~~\text{in} ~~{\mathcal{N}}, \frac{\partial u}{\partial \nu}&=0 ~~\text{in}~~ \partial \Omega \cap \overline{\mathcal{N}}, \end{split} \right.\tag{} \end{equation} where , is a non empty open set, , are open subsets of such that , and is a bounded set with smooth boundary, is a real parameter and We establish the existence and some characteristics of the first eigenvalue and associated eigenfunctions to the above problem, based on the topology of the sets and . Next, we apply these results to establish bifurcation type results, both from zero and infinity for the problem \eqref{ql} which is an asymptotically linear problem inclined with .
Cite
@article{arxiv.2411.16499,
title = {On an eigenvalue problem associated with mixed operators under mixed boundary conditions},
author = {Jacques Giacomoni and Tuhina Mukherjee and Lovelesh Sharma},
journal= {arXiv preprint arXiv:2411.16499},
year = {2024}
}
Comments
25 pages