Isomorphism, nonisomorphism, and amenability of Lp UHF algebras

Abstract

In a previous paper, we introduced Lp UHF algebras for p in [1, ∞). We concentrated on the spatial Lp UHF algebras, which are classified up to isometric isomorphism by p and the scaled ordered K0-group. In this paper, we concentrate on a larger class, the Lp UHF algebras of tensor product type constructed using diagonal similarities. Such an algebra is still simple and has the same K-theory as the corresponding spatial Lp UHF algebra. For each choice of p and the K-theory, we provide uncountably many nonisomorphic such algebras. We further characterize the spatial algebras among them. In particular, if A is one of these algebras, then A is isomorphic (not necessarily isometrically) to a spatial Lp UHF algebra if and only if A is amenable as a Banach algebra, also if and only if A has approximately inner tensor flip. These conditions are also equivalent to a natural numerical condition defined in terms of the ingredients used to construct the algebra.