English

On Amenable and Coamenable Coideals

Operator Algebras 2023-08-04 v4 Functional Analysis

Abstract

We study relative amenability and amenability of a right coideal N~P(G)\widetilde{N}_P\subseteq \ell^\infty(\mathbb{G}) of a discrete quantum group in terms of its group-like projection PP. We establish a notion of a PP-left invariant state and use it to characterize relative amenability. We also develop a notion of coamenability of a compact quasi-subgroup NωL(G^)N_\omega\subseteq L^\infty(\widehat{\mathbb{G}}) that generalizes coamenability of a quotient as defined by Kalantar, Kasprzak, Skalski, and Vergnioux, where G^\widehat{\mathbb{G}} is the compact dual of G\mathbb{G}. In particular, we establish that the coamenable compact quasi-subgroups of G^\widehat{\mathbb{G}} are in one-to-one correspondence with the idempotent states on the reduced CC^*-algebra Cr(G^)C_r(\widehat{\mathbb{G}}). We use this work to obtain results for the duality between relative amenability and amenability of coideals in (G)\ell^\infty(\mathbb{G}) and coamenability of their codual coideals in L(G^)L^\infty(\widehat{\mathbb{G}}), making progress towards a question of Kalantar et al{.}.

Keywords

Cite

@article{arxiv.2003.04384,
  title  = {On Amenable and Coamenable Coideals},
  author = {Benjamin Anderson-Sackaney},
  journal= {arXiv preprint arXiv:2003.04384},
  year   = {2023}
}

Comments

v4: minor revisions. Accepted to Journal of Noncommutative Geometry. v3: significant errors corrected, including error in main theorem of v2. Exposition rewritten, minor changes to notation, and uninteresting results omitted. v2: completely rewritten. Many new results, with v1 contents in sections 4.5 and 5. 30 pages + references

R2 v1 2026-06-23T14:09:21.593Z