Completely coarse maps are $\mathbb R$-linear
Operator Algebras
2020-06-02 v1 Functional Analysis
Abstract
A map between operator spaces is called completely coarse if the sequence of its amplifications is equi-coarse. We prove that all completely coarse maps must be -linear. On the opposite direction of this result, we introduce a notion of embeddability between operator spaces and show that this notion is strictly weaker than complete -isomorphic embeddability (in particular, weaker than complete -isomorphic embeddability). Although weaker, this notion is strong enough for some applications. For instance, we show that if an infinite dimensional operator space embeds in this weaker sense into Pisier's operator space , then must be completely isomorphic to .
Cite
@article{arxiv.2006.00948,
title = {Completely coarse maps are $\mathbb R$-linear},
author = {Bruno M. Braga and Javier Alejandro Chávez-Domínguez},
journal= {arXiv preprint arXiv:2006.00948},
year = {2020}
}