Hardy and Hardy-Sobolev inequalities on Riemannian manifolds

Abstract

Let (M,g) be a smooth compact Riemannian manifold of dimension N ≥ 3 . Given p0 ∈ M, λ ∈ R and σ ∈ (0,2], we study existence and non existence of minimizers of the following quotient: equationPaper Equation μλ,σ=∈fu ∈ H1(M) 0 ∫M |∇ u|2 dvg -λ ∫M u2 dvg (∫M -σ |u|2*(σ) dvg)2/2*(σ), equation where (.):=dist(p0,.) denoted the geodesic distance from p ∈ M to p0. In particular for σ=2, we provide sufficient and necessary conditions of existence of minimizers in terms of λ. For σ∈ (0,2) we prove existence of minimizers under scalar curvature pinching.