Sharp Poincar\'e inequalities under Measure Contraction Property

Abstract

We prove a sharp Poincar\'e inequality for subsets of (essentially non-branching) metric measure spaces satisfying the Measure Contraction Property MCP(K,N), whose diameter is bounded above by D. This is achieved by identifying the corresponding one-dimensional model densities and a localization argument, ensuring that the Poincar\'e constant we obtain is best possible as a function of K, N and D. Another new feature of our work is that we do not need to assume that is geodesically convex, by employing the geodesic hull of on the energy side of the Poincar\'e inequality. In particular, our results apply to geodesic balls in ideal sub-Riemannian manifolds, such as the Heisenberg group.