Optimal Hardy-Sobolev Inequalities on Compact Riemannain Manifolds

Abstract

Given a compact Riemannian Manifold (M,g) of dimension n > 2, a point x0 in M and s in (0,2). We let 2*(s) = 2(n-s)/(n-2) be the critical Hardy-Sobolev exponent. The Hardy-Sobolev embedding yields the existence of A,B > 0 such that (∫M|u|2*(s)dvg)2/2*(s) ≤ A∫M |∇ u|g2 dvg +B∫M u2 dvg for all u in H12(M). It has been proved that A≤ K(n,s) and that one can take any value A > K(n,s) in in the above inequality where K(n,s) is the best possible constant in the Euclidean Hardy-Sobolev inequality. In the present manuscript, we prove that one can also take A = K(n,s) in the above inequality.