Uniqueness and Nondegeneracy of Ground States for (-)s Q + Q - Qα+1 = 0 in R

Abstract

We prove uniqueness of ground state solutions Q = Q(|x|) ≥ 0 for the nonlinear equation (-)s Q + Q - Qα+1= 0 in R, where 0 < s < 1 and 0 < α < 4s1-2s for s < 1/2 and 0 < α < ∞ for s ≥ 1/2. Here (-)s denotes the fractional Laplacian in one dimension. In particular, we generalize (by completely different techniques) the specific uniqueness result obtained by Amick and Toland for s=1/2 and α=1 in [Acta Math., 167 (1991), 107--126]. As a technical key result in this paper, we show that the associated linearized operator L+ = (-)s + 1 - (α+1) Qα is nondegenerate; i.\,e., its kernel satisfies ker\, L+ = span\, \Q'\. This result about L+ proves a spectral assumption, which plays a central role for the stability of solitary waves and blowup analysis for nonlinear dispersive PDEs with fractional Laplacians, such as the generalized Benjamin-Ono (BO) and Benjamin-Bona-Mahony (BBM) water wave equations.