Global structure of radial positive solutions for a prescribed mean curvature problem in a ball

Abstract

In this paper, we are concerned with the global structure of radial positive solutions of boundary value problemdiv(φN(∇ v))+λ f(|x|, v)=0 in B(R), v=0 on ∂ B(R), where φN(y)=y1-|y|2, y∈ RN, λ is a positive parameter, B(R)=\x∈ RN :|x|<R\, and |·| denote the Euclidean norm in RN. All results, depending on the behavior of nonlinear term f near 0, are obtained by using global bifurcation techniques.