Non-commutative ambits and equivariant compactifications

Abstract

We prove that an action :A M(C0(G) A) of a locally compact quantum group on a C*-algebra has a universal equivariant compactification, and prove a number of other category-theoretic results on G-equivariant compactifications: that the categories compactifications of and A respectively are locally presentable (hence complete and cocomplete), that the forgetful functor between them is a colimit-creating left adjoint, and that epimorphisms therein are surjective and injections are regular monomorphisms. When G is regular coamenable we also show that the forgetful functor from unital G-C*-algebras to unital C*-algebras creates finite limits and is comonadic, and that the monomorphisms in the former category are injective.