On Baire-like spaces of spaces of continuous vector-valued functions (Q1297796)

The following are the main results of the paper: Theorem 1. Assume \(X\) is a strongly Lindelöf space and \(E\) is metrizable. Then (a) \(C(X,E)\) is Baire-like iff \(E\) is barelled; (b) each barelled subspace of \(C(X,E)\) is Baire-like. Theorem 2. Assume \(X\) is a Lindelöf \(P\)-space and \(E\) is Fréchet. Then (c) each sequentially closed subspace \(Y\) of \(C(X,E)\) is (tvs-) barelled and Baire-like; (d) if, in addition, \(F\) is an inductive limit of an increasing sequence \((F_n)\) of locally bounded complete tvs and \(T:Y \rightarrow F\) is a closed linear map, then there must be some rank \(m\) such that \(T(Y) \subseteq F_m\) and \(T:Y\rightarrow F_m\) is continuous.