Full quantum crossed products, invariant measures, and type-I lifting

Abstract

We show that for a closed embedding H G of locally compact quantum groups (LCQGs) with G/H admitting an invariant probability measure, a unitary G-representation is type-I if its restriction to H is. On a related note, we also prove that if an action G A of an LCQG on a unital C*-algebra admits an invariant state then the full group algebra of G embeds into the resulting full crossed product (and into the multiplier algebra of that crossed product if the original algebra is not unital). We also prove a few other results on crossed products of LCQG actions, some of which seem to be folklore; among them are (a) the fact that two mutually dual quantum-group morphisms produce isomorphic full crossed products, and (b) the fact that full and reduced crossed products by dual-coamenable LCQGs are isomorphic.