A curve of positive solutions for an indefinite sublinear Dirichlet problem

Abstract

We investigate the existence of a curve q uq, with q∈(0,1), of positive solutions for the problem (Pa,q): - u=a(x)uq in , u=0 on ∂, where is a bounded and smooth domain of RN and a:→R is a sign-changing function (in which case the strong maximum principle does not hold). In addition, we analyze the asymptotic behavior of uq as q→0+ and q→1-. We also show that in some cases uq is the ground state solution of (Pa,q). As a byproduct, we obtain existence results for a singular and indefinite Dirichlet problem. Our results are mainly based on bifurcation and sub-supersolutions methods.