Entropy and stability of hyperbolic manifolds

Abstract

Let (M,g0) be a closed oriented hyperbolic manifold of dimension at least 3. By the volume entropy inequality of G. Besson, G. Courtois and S. Gallot, for any Riemannian metric g on M with same volume as g0, its volume entropy h(g) satisfies h(g)≥ n-1 with equality only when g is isometric to g0. We show that the hyperbolic metric g0 is stable in the following sense: if gi is a sequence of Riemaniann metrics on M of same volume as g0 and if h(gi) converges to n-1, then there are smooth subsets Zi⊂ M such that both Vol(Zi,gi) and Area(∂ Zi,gi) tend to 0, and (M Zi,gi) converges to (M,g0) in the measured Gromov-Hausdorff topology. The proof relies on showing that any spherical Plateau solution for M is intrinsically isomorphic to (M,(n-1)24n g0).