Simultaneous similarity, bounded generation and amenability
Abstract
We prove that a discrete group is amenable iff it is strongly unitarizable in the following sense: every unitarizable representation on can be unitarized by an invertible chosen in the von Neumann algebra generated by the range of . Analogously a -algebra is nuclear iff any bounded homomorphism is strongly similar to a -homomorphism in the sense that there is an invertible operator in the von Neumann algebra generated by the range of such that is a -homomorphism. An analogous characterization holds in terms of derivations. We apply this to answer several questions left open in our previous work concerning the length of the maximal tensor product of two unital -algebras, when we consider its generation by the subalgebras and . We show that if either for or when is the -algebra (either full or reduced) of a non Abelian free group, then must be nuclear. We also show that iff the canonical quotient map from the unital free product onto remains a complete quotient map when restricted to the closed span of the words of length .
Keywords
Cite
@article{arxiv.math/0508223,
title = {Simultaneous similarity, bounded generation and amenability},
author = {Gilles Pisier},
journal= {arXiv preprint arXiv:math/0508223},
year = {2014}
}
Comments
There are several improvements both to the exposition and to some results. The main refinement is that if the length of the minimal (rather than the maximal) tensor product of $A$ with another $C^*$-algebra $B$ is always finite, then $A$ is nuclear