Affine Approximation in Finite Nagata Dimension and Applications to Lipschitz-free spaces

Abstract

We show that if M is a metric space of Nagata dimension at most d, then there exists an atlas on M modeled on Rd such that every Lipschitz map f:M Y (with values in an arbitrary Banach space Y) can be uniformly approximated by maps that are affine, and thus C1-smooth, with respect to this atlas. The construction relies on random metric partitions and stochastic retractions inside Lipschitz-free spaces. As an application, we introduce approximate continuous upper gradient X-structures (ACUG X-structures) on metric spaces and prove that every space of finite Nagata dimension carries an ACUG structure modeled on a superreflexive Banach space. Finally, adapting a proof due to Bourgain, we show that if M has an ACUG superreflexive-structure, then the Lipschitz-free space F(M) has Pelczyński's property (V*). In particular, at least in the compact case, our result recovers all previously known examples of metric spaces M for which F(M) has property (V*).