Nonexistence of positive radial solutions for semipositone φ-Laplacian problems with superlinear reaction term

Abstract

The aim of this paper is to prove the nonexistence of positive radial solutions to the problem -φ u=λ f(u), x∈ B1(0), u(x)=0 on |x|=1, for λ>0 sufficiently large. Here, φ is a continuous function, φ denotes the φ-Laplacian operator which is defined by φ (u):=div (φ (|∇ u|) ∇ u), and B1(0) is the unit ball in RN, with N>1. Furthermore, f is a continuous, nondecreasing function such that f(0)<0, and its behavior at infinity is intimately related to φ. Our findings are presented in a combined format, employing both an indirect argument and an energy analysis.