Classification of Lp AF algebras

Abstract

We define spatial Lp AF algebras for p ∈ [1, ∞) \ 2 \, and prove the following analog of the Elliott AF algebra classification theorem. If A and B are spatial Lp AF algebras, then the following are equivalent: 1) A and B have isomorphic scaled preordered K0-groups. 2) A B as rings. 3) A B (not necessarily isometrically) as Banach algebras. 4) A is isometrically isomorphic to B as Banach algebras. 5) A is completely isometrically isomorphic to B as matrix normed Banach algebra. As background, we develop the theory of matrix normed Lp operator algebras, and show that there is a unique way to make a spatial Lp AF algebra into a matrix normed Lp operator algebra. We also show that any countable scaled Riesz group can be realized as the scaled preordered K0-group of a spatial Lp AF algebra.