Uniform Poincar\'e inequalities on measured metric spaces

Abstract

Consider a proper geodesic metric space (X,d) equipped with a Borel measure μ. We establish a family of uniform Poincar\'e inequalities on (X,d,μ) if it satisfies a local Poincar\'e inequality (Ploc) and a condition on growth of volume. Consequently if μ is doubling and supports (Ploc) then it satisfies a (σ,β,σ)-Poincar\'e inequality. If (X,d,μ) is a δ-hyperbolic space then using the volume comparison theorem in BCS we obtain a uniform Poincar\'e inequality with exponential growth of the Poincar\'e constant. If X is the universal cover of a compact CD(K,∞) space then it supports a uniform Poincar\'e inequality and the Poincar\'e constant depends on the growth of the fundamental group.