Mass and Asymptotics associated to Fractional Hardy-Schr\"odinger Operators in Critical Regimes

Abstract

We consider linear and non-linear boundary value problems associated to the fractional Hardy-Schr\"odinger operator Lγ,α: = (- )α2- γ|x|α on domains of Rn containing the singularity 0, where 0<α<2 and 0 γ < γH(α), the latter being the best constant in the fractional Hardy inequality on Rn. We tackle the existence of least-energy solutions for the borderline boundary value problem (Lγ,α-λ I)u= u2α(s)-1|x|s on , where 0≤ s <α <n and 2α(s)=2(n-s)n-α is the critical fractional Sobolev exponent. We show that if γ is below a certain threshold γcrit, then such solutions exist for all 0<λ <λ1(Lγ,α), the latter being the first eigenvalue of Lγ,α. On the other hand, for γcrit<γ <γH(α), we prove existence of such solutions only for those λ in (0, λ1(Lγ,α)) for which the domain has a positive fractional Hardy-Schr\"odinger mass mγ, λ(). This latter notion is introduced by way of an invariant of the linear equation (Lγ,α-λ I)u=0 on .