Estimates on the spectral interval of validity of the anti-maximum principle

TL;DR

This paper provides a variational upper bound for the spectral interval where the anti-maximum principle holds for a p-Laplacian problem, and studies the properties of ground state solutions within this interval.

Contribution

It introduces a new variational upper bound for the critical value  and analyzes the behavior of ground state solutions in the spectral interval.

Findings

Established a variational upper bound for 

Analyzed properties of ground state solutions in (,)

Provided insights into the spectral interval of validity for the anti-maximum principle

Abstract

The anti-maximum principle for the homogeneous Dirichlet problem to $-\Delta_p u = \lambda |u|^{p-2}u + f(x)$ with positive $f \in L^\infty(\Omega)$ states the existence of a critical value $\lambda_f > \lambda_1$ such that any solution of this problem with $\lambda \in (\lambda_1, \lambda_f)$ is strictly negative. In this paper, we give a variational upper bound for $\lambda_f$ and study its properties. As an important supplementary result, we investigate the branch of ground state solutions of the considered boundary value problem in $(\lambda_1,\lambda_2)$.