A weighted eigenvalue problem for mixed local and nonlocal operators with potential
Abstract
We study an {\it indefinite weighted eigenvalue problem} for an operator of {\it mixed-type} (that includes both the classical {\it -Laplacian} and the {\it fractional -Laplacian}) in a bounded open subset with {\it Lipschitz boundary} , which is given by \begin{align*} -\Delta_p u + (-\Delta_p)^su+V(x)|u|^{p-2}u&=\lambda g(x)|u|^{p-2}u~\text{in}~\Omega, u&=0~\text{in}~\mathbb{R}^N\setminus\Omega, \end{align*} where is a parameter, exponents , and for with a.e. in . Using the variational tools together with a {\it weak comparison} and {\it strong maximum principles}, we investigate the existence and uniqueness of {\it principal eigenvalue} and discuss its qualitative properties. Moreover, with the help of {\it Ljusternik-Schnirelman category theory}, it is proved that there exists a {\it nondecreasing sequence of positive eigenvalues} which goes to infinity. Further, we show that {\it the set of all positive eigenvalues is closed}, and {\it eigenfunctions} associated with every {\it positive eigenvalue} are bounded.
Cite
@article{arxiv.2409.01349,
title = {A weighted eigenvalue problem for mixed local and nonlocal operators with potential},
author = {R. Lakshmi and Ratan Kr. Giri and Sekhar Ghosh},
journal= {arXiv preprint arXiv:2409.01349},
year = {2024}
}
Comments
28 pages