English

Non-negative solutions of a sublinear elliptic problem

Analysis of PDEs 2024-03-08 v1

Abstract

In this paper the existence of solutions, (λ,u)(\lambda,u), of the problem Δu=λua(x)up1uin Ω,u=0on    Ω,-\Delta u=\lambda u -a(x)|u|^{p-1}u \quad \hbox{in }\Omega, \qquad u=0 \quad \hbox{on}\;\;\partial\Omega, is explored for 0<p<10 < p < 1. When p>1p>1, it is known that there is an unbounded component of such solutions bifurcating from (σ1,0)(\sigma_1, 0), where σ1\sigma_1 is the smallest eigenvalue of Δ-\Delta in Ω\Omega under Dirichlet boundary conditions on Ω\partial\Omega. These solutions have uPu \in P, the interior of the positive cone. The continuation argument used when p>1p>1 to keep uPu \in P fails if 0<p<10 < p < 1. Nevertheless when 0<p<10 < p < 1, we are still able to show that there is a component of solutions bifurcating from (σ1,)(\sigma_1, \infty), unbounded outside of a neighborhood of (σ1,)(\sigma_1, \infty), and having u0u \gneq 0. This non-negativity for uu cannot be improved as is shown via a detailed analysis of the simplest autonomous one-dimensional version of the problem: its set of non-negative solutions possesses a countable set of components, each of them consisting of positive solutions with a fixed (arbitrary) number of bumps. Finally, the structure of these components is fully described.

Keywords

Cite

@article{arxiv.2403.04396,
  title  = {Non-negative solutions of a sublinear elliptic problem},
  author = {Julián López-Gómez and Paul H. Rabinowitz and Fabio Zanolin},
  journal= {arXiv preprint arXiv:2403.04396},
  year   = {2024}
}

Comments

25 pages, 11 figures

R2 v1 2026-06-28T15:12:10.869Z