A Banach algebra encoding quantum group duality

Abstract

We introduce and study a new Banach algebra structure on the trace-zero subspace T(L2(G))0 of trace class operators for any locally compact quantum group G; it is defined through a mixed Lie-type product of the two dual products on T(L2(G)) arising from the canonical extensions of the co-products of G and G. The surprising fact that this new product is indeed associative stems precisely from the duality of the latter two products. This, in particular, gives new faithful associative products on trace-zero matrices in Md(C). After establishing some basic properties, we show that the single algebra T(L2(G))0 captures simultaneous properties of G and G, is faithful for a large class of quantum groups, and encodes both Mrcb(L1(G)) and Mrcb(L1(G)) as left, respectively right, completely bounded module maps on T(L2(G)). We finish by exhibiting an analogous product on the trace-zero nuclear operators N(Lp(G))0 for a locally compact group G and p∈(1,∞). Building on [7], our work suggests an approach for developing an Lp-version of locally compact quantum group theory.