Classification of the spaces Cp*(X) within the Borel-Wadge hierarchy for a projective space X

Abstract

We study the complexity of the space C*p(X) of bounded continuous functions with the topology of pointwise convergence. We are allowed to use descriptive set theoretical methods, since for a separable metrizable space X, the measurable space of Borel sets in C*p(X) (and also in the space Cp(X) of all continuous functions) is known to be isomorphic to a subspace of a standard Borel space. It was proved by A. Andretta and A. Marcone that if X is a σ-compact metrizable space, then the measurable spaces Cp(X) and C*p(X) are standard Borel and if X is a metrizable analytic space which is not σ-compact then the spaces of continuous functions are Borel-11-complete. They also determined under the assumption of projective determinacy (PD) the complexity of Cp(X) for any projective space X and asked whether a similar result holds for C*p(X). We provide a positive answer, i.e. assuming PD we prove, that if n ≥ 2 and if X is a separable metrizable space which is in 1n but not in 1n-1 then the measurable space C*p(X) is Borel-1n-complete. This completes under the assumption of PD the classification of Borel-Wadge complexity of C*p(X) for X projective.