Equivalence of Quantum Metrics with a common domain

TL;DR

This paper characterizes Lipschitz morphisms between quantum compact metric spaces, showing that Lip-norms with shared domains are equivalent and introducing a noncommutative Lipschitz distance, with implications for perturbations and classifications.

Contribution

It provides a characterization of Lipschitz morphisms via domain preservation and introduces a noncommutative Lipschitz distance, advancing the understanding of quantum metric space equivalences.

Findings

Lower semi-continuous Lip-norms with shared domain are equivalent.

Uniformly equivalent Lip-norms form totally bounded classes.

Constructed a noncommutative Lipschitz distance for quantum spaces.

Abstract

We characterize Lipschitz morphisms between quantum compact metric spaces as those *-morphisms which preserve the domain of certain noncommutative analogues of Lipschitz seminorms, namely lower semi-continuous Lip-norms. As a corollary, lower semi-continuous Lip-norms with a shared domain are in fact equivalent. We then note that when a family of lower semi-continuous Lip-norms are uniformly equivalent, then they give rise to totally bounded classes of quantum compact metric spaces, and we apply this observation to several examples of perturbations of quantum metric spaces. We also construct the noncommutative generalization of the Lipschitz distance between quantum compact metric spaces.