On the Ascoli property for locally convex spaces and topological groups

Abstract

We characterize Ascoli spaces by showing that a Tychonoff space X is Ascoli iff the canonical map from the free locally convex space L(X) over X into Ck(Ck(X)) is an embedding of locally convex spaces. We prove that an uncountable direct sum of non-trivial locally convex spaces is not Ascoli. If a c0-barrelled space X is weakly Ascoli, then X is linearly isomorphic to a dense subspace of R for some . Consequently, a Fr\'echet space E is weakly Ascoli iff E=RN for some N≤ω. If X is a μ-space and a k-space (for example, metrizable), then Ck(X) is weakly Ascoli iff X is discrete. We prove that the weak* dual space of a Banach space E is Ascoli iff E is finite-dimensional.