English

A Banach algebra encoding quantum group duality

Operator Algebras 2026-02-24 v1 Functional Analysis

Abstract

We introduce and study a new Banach algebra structure on the trace-zero subspace T(L2(G))0\mathcal{T}(L^2(\mathbb{G}))_0 of trace class operators for any locally compact quantum group G\mathbb{G}; it is defined through a mixed Lie-type product of the two dual products on T(L2(G))\mathcal{T}(L^2(\mathbb{G})) arising from the canonical extensions of the co-products of G\mathbb{G} and G^\widehat{\mathbb{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)M_d(\mathbb{C}). After establishing some basic properties, we show that the single algebra T(L2(G))0\mathcal{T}(L^2(\mathbb{G}))_0 captures simultaneous properties of G\mathbb{G} and G^\widehat{\mathbb{G}}, is faithful for a large class of quantum groups, and encodes both Mcbr(L1(G))M^r_{cb}(L^1(\mathbb{G})) and Mcbr(L1(G^))M^r_{cb}(L^1(\widehat{\mathbb{G}})) as left, respectively right, completely bounded module maps on T(L2(G))\mathcal{T}(L^2(\mathbb{G})). We finish by exhibiting an analogous product on the trace-zero nuclear operators N(Lp(G))0\mathcal{N}(L^p(G))_0 for a locally compact group GG and p(1,)p\in(1,\infty). Building on [7], our work suggests an approach for developing an LpL^p-version of locally compact quantum group theory.

Keywords

Cite

@article{arxiv.2602.19589,
  title  = {A Banach algebra encoding quantum group duality},
  author = {Jason Crann and Matthias Neufang},
  journal= {arXiv preprint arXiv:2602.19589},
  year   = {2026}
}

Comments

21 pages

R2 v1 2026-07-01T10:47:00.123Z