Schr\"odinger operators with Leray-Hardy potential singular on the boundary

Abstract

We study the kernel function of the operator u → L μ u = -- + μ |x| 2 u in a bounded smooth domain ⊂ R N + such that 0 ∈ ∂, where μ -- N 2 4 is a constant. We show the existence of a Poisson kernel vanishing at 0 and a singular kernel with a singularity at 0. We prove the existence and uniqueness of weak solutions of L μ u = 0 in with boundary data + kδ 0 , where is a Radon measure on ∂ \ 0, k ∈ R and show that this boundary data corresponds in a unique way to the boundary trace of positive solution of L μ u = 0 in .