A sharp Sobolev trace inequality involving the mean curvature on Riemannian manifolds

Abstract

In this paper, we examine the boundary L2 term of the sharp Sobolev trace inequality \|u\|Lq( M)2≤ S \|∇g u\|L2(M)2 +A(M,g)\|u\|2L2( M) on Riemannian manifolds (M,g) with boundaries M, where q=2(n-1)n-2, S is the best constant and A(M,g) is some positive constant depending only on M and g. We obtain a sharp trace inequality involving the mean curvature in a remainder term, which would fail in general once the mean curvature is replaced by any smaller function.