On Ideals of L1-algebras of Compact Quantum Groups

Abstract

We develop a notion of a non-commutative hull for a left ideal of the L1-algebra of a compact quantum group G. A notion of non-commutative spectral synthesis for compact quantum groups is proposed as well. It is shown that a certain Ditkin's property at infinity (which includes those G where the dual quantum group G has the approximation property) is equivalent to every hull having synthesis. We use this work to extend recent work of White that characterizes the weak* closed ideals of a measure algebra of a compact group to those of the measure algebra of a coamenable compact quantum group. In the sequel, we use this work to study bounded right approximate identities of certain left ideals of L1(G) in relation to coamenability of G.