The Menger and projective Menger properties of function spaces with the set-open topology
Abstract
For a Tychonoff space X and a family λ of subsets of X, we denote by Cλ(X) the space of all real-valued continuous functions on X with the set-open topology. In this paper, we study the Menger and projective Menger properties of a Hausdorff space Cλ(X). Our main results state that if λ is a π-network of X then (1) Cλ(X) is Menger space if and only if it is σ-compact, if Y is a dense subset of X then (2) Cp(Y X) is projective Menger space if and only if it is σ-pseudocompact.
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