Nonexistence of isoperimetric sets in spaces of positive curvature

Abstract

For every d 3, we construct a noncompact smooth d-dimensional Riemannian manifold with strictly positive sectional curvature without isoperimetric sets for any volume below 1. We construct a similar example also for the relative isoperimetric problem in (unbounded) convex sets in Rd. The examples we construct have nondegenerate asymptotic cone. The dimensional constraint d 3 is sharp. Our examples exhibit nonexistence of isoperimetric sets only for small volumes; indeed in nonnegatively curved spaces with nondegenerate asymptotic cones isoperimetric sets with large volumes always exist. This is the first instance of noncollapsed nonnegatively curved space without isoperimetric sets.