Sequential BKW-operators and function algebras (Q1914804)

Let \(X,Y\) be normed spaces, and \(B(X,Y)\) the set of all bounded linear operators from \(X\) into \(Y\). For a given subset \(S\) of \(X\), the set of all operators \(T\) in \(B(X,Y)\) is called BKW (in honor of Bohmann, Korovkin and Wulbert) if the following condition is satisfied: BKW: For every net \(\{T_\lambda \}_{\lambda\in \Lambda}\) in \(B(X,Y)\) with \(|T_\lambda |\to|T|\) and \(|T_\lambda s-Ts|\to 0\) for each \(s\in S\), it follows that \(|T_\lambda x- Tx|\to 0\) fore very \(x\in X\) [see \textit{S.-E. Takahasi}, J. Approximation Theory 72, No. 2, 174-184 (1993; Zbl 0778.41008)]. Generalizing this idea, sequential type BKW-operators are studied, satisfying the following condition: s-BKW: For every sequence \(\{T_n\}_{n\in \mathbb{N}}\) in \(B(X,Y)\) with \(|T_n|\to|T|\) and \(|T_n s-Ts|\to 0\) for each \(s\in S\), it follows that \(|T_nx- Tx|\to 0\) for every \(x\in X\). As an application, the BKW operators on the disk algebra for test functions \(\{1,z\}\) are determined.