Some barrelledness properties of \(c_{0}(\Omega,X)\) (Q1856873)

For a nonempty set \(\Omega\) and a normed space \(X\), let \(c_0 (\Omega,X)\) denote the vector space of all functions \(f:\Omega\to X\) such that the set \(\{\omega\in \Omega\mid \|f(\omega)\|>\varepsilon\}\) is finite (or empty) for all \(\varepsilon>0\). The authors prove that the normed space \(c_0 (\Omega,X)\) (equipped with the supremum norm) is barrelled, ultrabornological or unordered Baire-like if and only if \(X\) is, respectively, barrelled, ultrabornological or unordered Baire-like. (Recall that a Hausdorff locally convex space \(E\) is called unordered Baire-like if, given a sequence \((V_n)\) of closed absolutely convex subsets of \(E\) with \(E=\cup_{n\in \mathbb{N}}V_n\) there is \(m\in\mathbb{N}\) such that \(V_m\) is a neighborhood of zero.) For the barrelledness result see also [\textit{A. Fernández, M. Florencio} and \textit{J. Oliveros}, Czech. Math. J. 50, 495-465 (2000)].