Topological rigidity of compact manifolds supporting Sobolev-type inequalities

Abstract

Let (M,g) be an n-dimensional (n≥ 3) compact Riemannian manifold with Ric(M,g)≥ (n-1)g. If (M,g) supports an AB-type critical Sobolev inequality with Sobolev constants close to the optimal ones corresponding to the standard unit sphere ( Sn,g0), we prove that (M,g) is topologically close to ( Sn,g0). Moreover, the Sobolev constants on (M,g) are precisely the optimal constants on the sphere ( Sn,g0) if and only if (M,g) is isometric to ( Sn,g0); in particular, the latter result answers a question of V.H. Nguyen.