A simple proof of reflexivity and separability of N1,p Sobolev spaces

Abstract

We present an elementary proof of a well-known theorem of Cheeger which states that if a metric-measure space X supports a p-Poincar\'e inequality, then the N1,p(X) Sobolev space is reflexive and separable whenever p∈ (1,∞). We also prove separability of the space when p=1. Our proof is based on a straightforward construction of an equivalent norm on N1,p(X), p∈ [1,∞), that is uniformly convex when p∈ (1,∞). Finally, we explicitly construct a functional that is pointwise comparable to the minimal p-weak upper gradient, when p∈ (1,∞).