Second radial eigenfunctions to a fractional Dirichlet problem and uniqueness for a semilinear equation
Abstract
We analyze the shape of radial second Dirichlet eigenfunctions of fractional Schr\"odinger type operators of the form (-)s +V in the unit ball B in RN with a nondecreasing radial potential V. Specifically, we show that the eigenspace corresponding to the second radial eigenvalue is simple and spanned by an eigenfunction u which changes sign precisely once in the radial variable and does not have zeroes anywhere else in B. Moreover, by a new Hopf type lemma for supersolutions to a class of degenerate mixed boundary value problems, we show that u has a nonvanishing fractional boundary derivative on ∂ B. We apply this result to prove uniqueness and nondegeneracy of positive ground state solutions to the problem (-)s u+λ u=up on B, \; u=0 on RN B. Here s∈ (0,1), λ≥ 0 and p>1 is strictly smaller than the critical Sobolev exponent.
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