A bifurcation phenomenon for the critical Laplace and p-Laplace equation in the ball

Abstract

In this paper we show that the number of radial positive solutions of the following critical problem p u(x) + λ K(|x|) \,u(x) \, |u(x)|q-2 =0\,, u(x)>0 |x|<1, u(x)=0 |x|=1, where q= npn-p, 2nn+2 p 2 and x ∈ Rn, undergoes a bifurcation phenomenon. Namely, the problem admits one solution for any λ>0 if K is steep enough at 0, while it admits no solutions for λ small and two solutions for λ large if K is too flat at 0. The existence of the second solution is new, even in the classical Laplace case. The proofs use Fowler transformation and dynamical systems tools.

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