Infinitely many global continua bifurcating from a single solution of an elliptic problem with concave-convex nonlinearity

Abstract

We study the bifurcation of solutions of semilinear elliptic boundary value problems of the form align* aligned - u &= fλ(|x|,u,|∇ u|) &&in , u &= 0 &&on ∂, aligned align* on an annulus ⊂RN, with a concave-convex nonlinearity, a special case being the nonlinearity first considered by Ambrosetti, Brezis and Cerami: fλ(|x|,u,|∇ u|)=λ|u|q-2u + |u|p-2u with 1<q<2<p. Although the trivial solution u00 is nondegenerate if λ=0 we prove that (λ0,u0)=(0,0) is a bifurcation point. In fact, the bifurcation scenario is very singular: We show that there are infinitely many global continua of radial solutions Cj⊂R×C1(), j∈N0 which bifurcate from the trivial branch R×\0\ at (λ0,u0)=(0,0) and consist of solutions having precisely j nodal annuli. A detailed study of these continua shows that they accumulate at R0×\0\ so that every (λ,0) with λ0 is a bifurcation point. Moreover, adding a point at infinity to C1() they also accumulate at R×\∞\, so there is bifurcation from infinity at every λ∈R.