English

Integrable actions and quantum subgroups

Operator Algebras 2016-03-22 v1 Quantum Algebra

Abstract

We study homomorphisms of locally compact quantum groups from the point of view of integrability of the associated action. For a given homomorphism of quantum groups Π ⁣:HG\Pi\colon\mathbb{H}\to\mathbb{G} we introduce quantum groups H/ ⁣kerΠ\mathbb{H}/\!\ker{\Pi} and imΠ\overline{\mathrm{im}\,\Pi} corresponding to the classical quotient by kernel and closure of image. We show that if the action of H\mathbb{H} on G\mathbb{G} associated to Π\Pi is integrable then H/ ⁣kerΠimΠ\mathbb{H}/\!\ker\Pi\cong\overline{\mathrm{im}\,\Pi} and characterize such Π\Pi. As a particular case we consider an injective continuous homomorphism Π ⁣:HG\Pi\colon{H}\to{G} between locally compact groups HH and GG. Then Π\Pi yields an integrable action of HH on L   ⁣ ⁣(G)L^\infty\;\!\!(G) if and only if its image is closed and Π\Pi is a homeomorphism of HH onto imΠ\mathrm{im}\,\Pi. We also give characterizations of open quantum subgroups and of compact quantum subgroups in terms of integrability and show that a closed quantum subgroup always gives rise to an integrable action. Moreover we prove that quantum subgroups closed in the sense of Woronowicz whose associated homomorphism of quantum groups yields an integrable action are closed in the sense of Vaes.

Keywords

Cite

@article{arxiv.1603.06084,
  title  = {Integrable actions and quantum subgroups},
  author = {Paweł Kasprzak and Fatemeh Khosravi and Piotr M. Sołtan},
  journal= {arXiv preprint arXiv:1603.06084},
  year   = {2016}
}

Comments

18 pages

R2 v1 2026-06-22T13:14:26.996Z