Embeddings of Lp-operator algebras

Abstract

We study embeddings of Lp-operator algebras arising from (twis\-ted) étale groupoids, with particular emphasis on rigidity phenomena for p≠ 2. Our methods rely on a detailed analysis of core normalizers and their functorial behavior under algebra homomorphisms. Using the notion of actors between groupoids, we show that under natural hypotheses, embeddings between reduced Lp-groupoid algebras can be described entirely in terms of morphisms of the underlying groupoids. We further show that embeddings of Lp-groupoid algebras induce embeddings of the associated topological full groups. Our results provide new tools for studying embeddability questions in the Lp-setting, and are particularly helpful when ruling out the existence of embeddings. As applications, we obtain strong embeddability results both for spatial AF Lp-operator algebras and for tensor products of Lp-Cuntz algebras. For p ∈ \1,2\, a reduced Lp-groupoid algebra associated with a principal étale groupoid embeds into a spatial AF Lp-operator algebra if and only if the underlying groupoid is AF. In particular, and in contrast with classical results of Pimsner-Voiculescu, irrational Lp-noncommutative tori do not embed into spatial AF Lp-operator algebras for p≠ 2. Furthermore, if p≠ 2, there is no unital contractive homomorphism from O2p p O2p into O2p, showing that there is no Lp-analog of Kirchberg's O2-embedding theorem.