Topological properties of function spaces over ordinals

Abstract

A topological space X is said to be an Ascoli space if any compact subset K of Ck(X) is evenly continuous. This definition is motivated by the classical Ascoli theorem. We study the kR-property and the Ascoli property of Cp() and Ck() over ordinals . We prove that Cp() is always an Ascoli space, while Cp() is a kR-space iff the cofinality of is countable. In particular, this provides the first Cp-example of an Ascoli space which is not a kR-space, namely Cp(ω1). We show that Ck() is Ascoli iff cf() is countable iff Ck() is metrizable.