Multiplicity and stability of the Pohozaev obstruction for Hardy-Schr\"odinger equations with boundary singularity

Abstract

Let be a smooth bounded domain in Rn (n≥ 3) such that 0∈∂ . In this memoir, we consider issues of non-existence, existence, and multiplicity of variational solutions in H1,02() for the borderline Dirichlet problem, - u-γ u|x|2- h(x) u = |u|2(s)-2u|x|s in , where 0<s<2, 2(s):=2(n-s)n-2, γ∈R and h∈ C0(). We use sharp blow-up analysis on --possibly high energy-- solutions of corresponding subcritical problems to establish, for example, that if γ<n24-1 and the principal curvatures of ∂ at 0 are non-positive but not all of them vanishing, then the above equation has an infinite number of (possibly sign-changing) solutions in H1,02(). This complements results of the first and third authors, who had previously shown that if γ≤ n24-14 and the mean curvature of ∂ at 0 is negative, then the equation has a positive solution. On the other hand, the sharp blow-up analysis also allows us to prove that if the mean curvature at 0 is non-zero and if the mass (when defined) does not vanish, then there is a surprising stability under C1-perturbations of the potential h of those regimes where no variational positive solutions exist. In particular, and in sharp contrast with the non-singular case (i.e., when γ=s=0), we show non-existence of such solutions for (E) in any dimension, whenever is star-shaped and h is close to 0, which include situations not covered by the classical Pohozaev obstruction.