Characterisations of Sobolev spaces and constant functions over metric spaces

Abstract

In a doubling metric measure space (X,,μ) supporting a Poincar\'e inequality, we give a new characterisation of first-order Sobolev spaces by mean oscillations, and extend previous characterisations of constant functions in terms of the finiteness of certain integrals through a new approach. As a key tool of independent potential, we introduce a novel ``macroscopic'' Poincar\'e inequality, whose right-hand side has oscillations of the same form as the left-hand side, but at a smaller macroscopic scale r∈(0,R). Besides intrinsic interest, these results are motivated by applications to quantitative compactness properties of commutators [f,T] of pointwise multipliers and singular integrals. With pivotal use of the present results, a characterisation of commutator mapping properties, over the same class of general domains (X,,μ), is obtained in a companion paper.