Positive solutions of indefinite semipositone problems via sub-super solutions

Abstract

Let ⊂RN, N≥1, be a smooth bounded domain, and let m:→R be a possibly sign-changing function. We investigate the existence of positive solutions for the semipositone problem - u=λ m(x)(f(u)-k) in , u=0 on ∂, where λ,k>0 and f is either sublinear at infinity with f(0)=0, or f has a singularity at 0. We prove the existence of a positive solution for certain ranges of λ provided that the negative part of m is suitably small. Our main tool is the sub-supersolutions method, combined with some rescaling properties.