Finitary approximations of coarse structures (Q2028181)

Let \((X,\mathcal E)\) be a coarse space. A subset \(\mathcal E'\subseteq \mathcal E\) is called a \textit{base} of \((X,\mathcal E)\) if for every \(E\in\mathcal E\) there exists \(E'\in \mathcal E'\) such that \(E\subseteq E'\). A coarse space \((X,\mathcal E)\) is called \textit{cellular} if it has a base consisting of equivalences. (More precise definitions are given in the paper under review and in [the author and \textit{K. Protasova}, Mat. Stud. 53, No. 1, 100--108 (2020; Zbl 1437.54026)]). In the paper the notion of a \(\lambda\)-\textit{stable} class of coarse spaces is studied. In [loc. cit.] the following question was raised: \textit{is the class of cellular spaces \(\lambda\)-stable}? In the given note this question is answered in the negative in ZFC. The authors mention that the question has been solved under some set-theoretical assumptions by the author and \textit{K. Protasova} [loc. cit.].