English

Principal eigenvalues and eigenfunctions for fully nonlinear equations in punctured balls

Analysis of PDEs 2023-05-02 v1

Abstract

This paper is devoted to the proof of the existence of the principal eigenvalue and related eigenfunctions for fully nonlinear uniformly elliptic equations posed in a punctured ball, in presence of a singular potential. More precisely, we analyze existence, uniqueness and regularity of solutions (λˉγ,uγ)( \bar\lambda_\gamma, u_\gamma) of the equation F(D2uγ)+λˉγuγrγ=0 in B(0,1){0}, uγ=0 on B(0,1)F( D^2 u_\gamma)+ \bar \lambda_\gamma \frac{u_\gamma}{r^\gamma} = 0\ {\rm in} \ B(0,1)\setminus \{0\}, \ u_\gamma = 0 \ {\rm on} \ \partial B(0,1) where uγ>0u_\gamma>0 in B(0,1){0}B(0,1)\setminus \{0\}, and γ>0\gamma >0. We prove existence of radial solutions which are continuous on B(0,1)\overline{ B(0,1)} in the case γ<2\gamma <2, existence of unbounded solutions in the case γ=2\gamma = 2 and a non existence result for γ>2\gamma >2. We also give the explicit value of λˉ2\bar \lambda_2 in the case of Pucci's operators, which generalizes the Hardy--Sobolev constant for the Laplacian.

Keywords

Cite

@article{arxiv.2305.00728,
  title  = {Principal eigenvalues and eigenfunctions for fully nonlinear equations in punctured balls},
  author = {Isabeau Birindelli and Françoise Demengel and Fabiana Leoni},
  journal= {arXiv preprint arXiv:2305.00728},
  year   = {2023}
}

Comments

27 pages

R2 v1 2026-06-28T10:22:20.758Z