The Hardy--Schr\"odinger Operator on the Poincar\'e Ball: Compactness and Multiplicity

Abstract

Let be a compact smooth domain containing zero in the Poincar\'e ball model of the Hyperbolic space Bn (n ≥ 3) and let -Bn be the Laplace-Beltrami operator on Bn, associated with the metric gBn= 4(1-|x|2)2g_Eucl. We consider issues of non-existence, existence, and multiplicity of variational solutions for the borderline Dirichlet problem, eqnarray* (E)~ \ arraylll -Bnu-γV2u -λ u&=V2(s)|u|2(s)-2u & in \\ u &=0 & on ∂ , array . eqnarray* where 0≤ γ ≤ (n-2)24, 0< s <2, 2(s):=2(n-s)n-2 is the corresponding critical Sobolev exponent, V2 (resp., V2(s)) is a Hardy-type potential (resp., Hardy-Sobolev weight) that is invariant under hyperbolic scaling and which behaves like 1r2 (resp., 1rs) at the origin. The bulk of this paper is a sharp blow-up analysis on approximate solutions of (E) with bounded but arbitrary high energies. Our analysis leads to existence of positive ground state solutions for (E), whenever n ≥ 4, 0 ≤ γ ≤ (n-2)24-1 and λ > 0. The latter result also holds true for n≥ 3 and γ > (n-2)24-1 provided the domain has a positive "hyperbolic mass". On the other hand, the same analysis yields that if γ > (n-2)24-1 and the mass is non vanishing, then there is a surprising stability of regimes where no variational positive solution exists. As for higher energy solutions to (E), we show that there are infinitely many of them provided n≥ 5, 0≤ γ<(n-2)24-4 and λ > n-2n-4 (n(n-4)4-γ ).