Rigidity for the isoperimetric inequality of negative effective dimension on weighted Riemannian manifolds

Abstract

We study, on a weighted Riemannian manifold of RicN ≥ K > 0 for N < -1, when equality holds in the isoperimetric inequality. Our main theorem asserts that such a manifold is necessarily isometric to the warped product R ×(K/(1-N)t) n-1 of hyperbolic nature, where n-1 is an (n-1)-dimensional manifold with lower weighted Ricci curvature bound and R is equipped with a hyperbolic cosine measure. This is a similar phenomenon to the equality condition of Poincar\'e inequality. Moreover, every isoperimetric minimizer set is isometric to a half-space in an appropriate sense.