Nondegeneracy of positive bubble solutions for generalized energy-critical Hartree equations

Abstract

In this paper, we show the nondegeneracy of positive bubble solutions for generalized energy-critical Hartree equations (NLH) equation* - ux -αN,λ ∫N upy\,x-y\,λ y\, up-1x =0, x∈ N equation* where N≥ 3, 0<λ<N, p=2N-λN-2 and αN,λ is a normalized constant such that u(x)=(1+|x|2)-N-22 is a bubble solution of the equation NLH. It solves an open nondegeneracy problem in MWX:Hartree, GMYZ2022cvpde and generalizes the partial nondegeneracy results in DY2019dcds, GWY2020na, LTX2021 to the full range 0<λ<N. The key observation is that by use of the stereographic projection S, the weighted pushforward map S* is one-to-one map between the null space of the linearized operator and the spherical harmonic function subspace H1N+1 of degree one.