On Banach spaces with angelic Mackey duals

Abstract

We show that if X is a sequentially reflexive Banach space, then its Mackey dual (X*,τ (X*, X)) is an angelic space. This builds on a result of J. Howard which says that in the Mackey dual (X*, τ (X*, X)) of a Banach space X, relative sequential compactness is, in general, strictly stronger than relative compactness and that the two notions of compactness are equivalent if X is reflexive or separable. Our main result gives a characterization of the sequentially reflexive spaces as the Banach spaces X for which the the finest locally convex topology on X* with the same precompact sets as the Mackey topology τ (X*, X) is the bound extension of τ (X*, X).