English

Compact and discrete subgroups of algebraic quantum groups I

Operator Algebras 2007-05-23 v2 Rings and Algebras

Abstract

Let GG be a locally compact group. Consider the C^*-algebra C0(G)C_0(G) of continuous complex functions on GG, tending to 0 at infinity. The product in GG gives rise to a coproduct ΔG\Delta_G on the C^*-algebra C0(G)C_0(G). A locally compact {\it quantum} group is a pair (A,Δ)(A,\Delta) of a C^*-algebra AA with a coproduct Δ\Delta on AA, satisfying certain conditions. The definition guarantees that the pair (C0(G),ΔG)(C_0(G),\Delta_G) is a locally compact quantum group and that conversely, every locally compact quantum group (A,Δ)(A,\Delta) is of this form when the underlying C^*-algebra AA is abelian. Assume now that GG is a locally compact group with a compact open subgroup KK. The algebra of complex functions on GG of {\it polynomial type} is a dense multiplier Hopf ^*-algebra with positive integrals (i.e. an algebraic quantum group}. The characteristic function of KK is a group-like projection in this algebraic quantum group. In this paper, we study group-like projections in an arbitrary algebraic quantum group. We find several associated objects that generalize the classical objects associated to a compact open subgroup of a locally compact group.

Keywords

Cite

@article{arxiv.math/0702458,
  title  = {Compact and discrete subgroups of algebraic quantum groups I},
  author = {M. B. Landstad and A. Van Daele},
  journal= {arXiv preprint arXiv:math/0702458},
  year   = {2007}
}