The 1-property of X is equivalent to the Choquet property of B1(X)

Abstract

We give a characterization of the 1-property of any Tychonoff space X in terms of the function space B1(X) of all Baire-one real-valued functions on a space X with the topology of pointwise convergence. We establish that for a Tychonoff space X the 1-property is equivalent to the Choquet property of B1(X). Also we construct under ZFC an example of a separable pseudocompact space X such that Cp(X) is -Frechet-Urysohn but X fails to be a 1-space. This answers a question of Kakol-Leiderman-Tkachuk.

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