Absolutely continuous mappings on doubling metric measure spaces

Abstract

Following Mal\'y's definition of absolutely continuous functions of several variables, we consider Q-absolutely continuous mappings f X V between a doubling metric measure space X and a Banach space V. The relation between these mappings and Sobolev mappings f∈ N1,p(X;V) for p Q is investigated. In particular, a locally Q-absolutely continuous mapping on an Ahlfors Q-regular space is a continuous mapping in N1,Qloc(X;V), as well as differentiable almost everywhere in terms of Cheeger derivatives provided V satisfies the Radon-Nikodym property. Conversely, though a continuous Sobolev mapping f∈ N1,Qloc(X;V) is generally not locally Q-absolutely continuous, this implication holds if f is further assumed to be pseudomonotone. It follows that pseudomonotone mappings satisfying a relaxed quasiconformality condition are also Q-absolutely continuous.