Compact and discrete subgroups of algebraic quantum groups I
Abstract
Let G be a locally compact group. Consider the C*-algebra C0(G) of continuous complex functions on G, tending to 0 at infinity. The product in G gives rise to a coproduct G on the C*-algebra C0(G). A locally compact quantum group is a pair (A,) of a C*-algebra A with a coproduct on A, satisfying certain conditions. The definition guarantees that the pair (C0(G),G) is a locally compact quantum group and that conversely, every locally compact quantum group (A,) is of this form when the underlying C*-algebra A is abelian. Assume now that G is a locally compact group with a compact open subgroup K. The algebra of complex functions on G of polynomial type is a dense multiplier Hopf *-algebra with positive integrals (i.e. an algebraic quantum group. The characteristic function of K 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.
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