On reflexive groups and function spaces with a Mackey group topology

Abstract

We prove that every reflexive abelian group G such that its dual group G has the qc-Glicksberg property is a Mackey group. We show that a reflexive abelian group of finite exponent is a Mackey group. We prove that, for a realcompact space X, the space Ck(X) is barrelled if and only if it is a Mackey group.