Lusin and Suslin properties of function spaces

Abstract

A topological space is Suslin (Lusin) if it is a continuous (and bijective) image of a Polish space. For a Tychonoff space X let Cp(X), Ck(X) and CF(X) be the space of continuous real-valued functions on X, endowed with the topology of pointwise convergence, the compact-open topology, and the Fell hypograph topology, respectively. For a metrizable space X we prove the equivalence of the following statements: (1) X is σ-compact, (2) Cp(X) is Suslin, (3) Ck(X) is Suslin, (4) CF(X) is Suslin, (5) Cp(X) is Lusin, (6) Ck(X) is Lusin, (7) CF(X) is Lusin, (8) Cp(X) is Fσ-Lusin, (9) Ck(X) is Fσ-Lusin, (10) CF(X) is Cδσ-Lusin. Also we construct an example of a sequential 0-space X with a unique non-isolated point such that the function spaces Cp(X), Ck(X) and CF(X) are not Suslin.