English

Neumann eigenvalue problems on the exterior domains

Analysis of PDEs 2025-06-17 v2

Abstract

For p(1,) p\in (1, \infty), we consider the following weighted Neumann eigenvalue problem on B1cB_1^c, the exterior of the closed unit ball in RNR^N: \begin{equation}\label{Neumann eqn} \begin{aligned} -\Delta_p \phi & = \lambda g |\phi|^{p-2} \phi \ \text{in}\ B^c_1, \\ \displaystyle\frac{\partial \phi}{\partial \nu} &= 0 \ \text{on} \ \partial B_1, \end{aligned} \end{equation} where Δp\Delta_p is the pp-Laplace operator and gLloc1(B1c)g \in L^1_{loc}(B^c_1) is an indefinite weight function. Depending on the values of pp and the dimension NN, we take gg in certain Lorentz spaces or weighted Lebesgue spaces and show that the above eigenvalue problem admits an unbounded sequence of positive eigenvalues that includes a unique principal eigenvalue. For this purpose, we establish the compact embeddings of W1,p(B1c)W^{1,p}(B^c_1) into Lp(B1c,g)L^p(B^c_1, |g|) for gg in certain weighted Lebesgue spaces. For N>pN>p, we also provide an alternate proof for the embedding of W1,p(B1c)W^{1,p}(B^c_1) into Lp,p(B1c)L^{p^*,p}(B^c_1). Further, we show that the set of all eigenvalues is closed.

Keywords

Cite

@article{arxiv.1812.10677,
  title  = {Neumann eigenvalue problems on the exterior domains},
  author = {T. V. Anoop and Nirjan Biswas},
  journal= {arXiv preprint arXiv:1812.10677},
  year   = {2025}
}
R2 v1 2026-06-23T06:57:11.299Z