The Ascoli property for function spaces and the weak topology of Banach and Fr\'echet spaces

Abstract

Following [3] we say that a Tychonoff space X is an Ascoli space if every compact subset K of Ck(X) is evenly continuous; this notion is closely related to the classical Ascoli theorem. Every kR-space, hence any k-space, is Ascoli. Let X be a metrizable space. We prove that the space Ck(X) is Ascoli iff Ck(X) is a kR-space iff X is locally compact. Moreover, Ck(X) endowed with the weak topology is Ascoli iff X is countable and discrete. Using some basic concepts from probability theory and measure-theoretic properties of 1, we show that the following assertions are equivalent for a Banach space E: (i) E does not contain isomorphic copy of 1, (ii) every real-valued sequentially continuous map on the unit ball Bw with the weak topology is continuous, (iii) Bw is a kR-space, (iv) Bw is an Ascoli space. We prove also that a Fr\'echet lcs F does not contain isomorphic copy of 1 iff each closed and convex bounded subset of F is Ascoli in the weak topology. However we show that a Banach space E in the weak topology is Ascoli iff E is finite-dimensional. We supplement the last result by showing that a Fr\'echet lcs F which is a quojection is Ascoli in the weak topology iff either F is finite dimensional or F is isomorphic to the product KN, where K∈\R,C\.