Morse index versus radial symmetry for fractional Dirichlet problems

Abstract

In this work, we provide an estimate of the Morse index of radially symmetric sign changing bounded weak solutions u to the semilinear fractional Dirichlet problem (-)su = f(u) in B, u = 0 in N B, where s∈(0,1), B⊂ RN is the unit ball centred at zero and the nonlinearity f is of class C1. We prove that for s∈(1/2,1) any radially symmetric sign changing solution of the above problem has a Morse index greater than or equal to N+1. If s∈ (0,1/2], the same conclusion holds under additional assumption on f. In particular, our results apply to the Dirichlet eigenvalue problem for the operator (-)s in B for all s∈ (0,1), and it implies that eigenfunctions corresponding to the second Dirichlet eigenvalue in B are antisymmetric. This resolves a conjecture of Ba\~nuelos and Kulczycki.