Shobha Oruganti¹ and R. Shivaji²

Copyright © 2006 Shobha Oruganti and R. Shivaji. This is an open access article distributed under the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.

Abstract

We study positive C1(Ω¯) solutions to classes of boundary value problems of the form −Δpu=g(x,u,c) in Ω,u=0 on ∂Ω, where Δp denotes the p-Laplacian operator defined by Δpz:=div(|∇z|p−2∇z); p>1, c>0 is a parameter, Ω is a bounded domain in RN; N≥2 with ∂Ω of class C2 and connected (if N=1, we assume that Ω is a bounded open interval), and g(x,0,c)<0 for some x∈Ω (semipositone problems). In particular, we first study the case when g(x,u,c)=λf(u)−c where λ>0 is a parameter and f is a C1([0,∞)) function such that f(0)=0, f(u)>0 for 0<u<r and f(u)≤0 for u≥r. We establish positive constants c0(Ω,r) and λ*(Ω,r,c) such that the above equation has a positive solution when c≤c0 and λ≥λ∗. Next we study the case when g(x,u,c)=a(x)up−1−uγ−1−ch(x) (logistic equation with constant yield harvesting) where γ>p and a is a C1(Ω¯) function that is allowed to be negative near the boundary of Ω. Here h is a C1(Ω¯) function satisfying h(x)≥0 for x∈Ω, h(x)≢0, and maxx∈Ω¯h(x)=1. We establish a positive constant c1(Ω,a) such that the above equation has a positive solution when c<c1 Our proofs are based on subsuper solution techniques.