The role of the mean curvature in a mixed Hardy-Sobolev trace inequality

Abstract

Let be a smooth bounded domain of RN+1 of boundary ∂ = 1 2 and such that ∂ 2 is a neighborhood of 0, h ∈ C0(∂ 2) and s ∈ [0,1). We propose to study existence of positive solutions to the following Hardy-Sobolev trace problem with mixed boundaries conditions align cases u= 0& in \\\ u=0 & on 1 \\\ ∂ u∂ =h(x) u + uq(s)-1d(x)s & on 2, cases align where q(s):=2(N-s)N-1 is the critical Hardy-Sobolev trace exponent and is the outer unit normal of ∂ . In particular, we prove existence of minimizers when N ≥ 3 and the mean curvature is sufficiently below the potential h at 0.