Positive solutions of an elliptic Neumann problem with a sublinear indefinite nonlinearity

Abstract

Let ⊂RN (N≥1) be a bounded and smooth domain and a:→R be a sign-changing weight satisfying ∫a<0. We prove the existence of a positive solution uq for the problem (Pa,q): - u=a(x)uq in , ∂ u∂=0 on ∂, if q0<q<1, for some q0=q0(a)>0. In doing so, we improve the existence result previously established in [16]. In addition, we provide the asymptotic behavior of uq as q→1-. When is a ball and a is radial, we give some explicit conditions on q and a ensuring the existence of a positive solution of (Pa,q). We also obtain some properties of the set of q's such that (Pa,q) admits a solution which is positive on . Finally, we present some results on nonnegative solutions having dead cores. Our approach combines bifurcation techniques, a priori bounds and the sub-supersolution method. Several methods and results apply as well to the Dirichlet counterpart of (Pa,q).