Order continuity of locally compact Boolean algebras (Q1383769)

The main result of the paper says that the following three conditions are equivalent for a Hausdorff topological Boolean algebra \(B\): (1) \(B\) is compact; (2) \(B\) is locally compact, order continuous and lattice complete; (3) \(B\) is order continuous, lattice complete and atomic. Reviewer's remark: This result is contained in Theorem 4.6 of the reviewer's article ``Die atomare Struktur topologischer Boolescher Ringe und \(s\)-beschränkter Inhalte'' [Stud. Math. 74, 57-81 (1982; Zbl 0488.28009)] observing that the topology of a locally compact Hausdorff topological Boolean algebra is an FN-topology (= monotone Ringtopologie). Other results of the paper under review are related to the reviewer's article ``Group- and vector-valued \(s\)-bounded contents'' [Lect. Notes Math. 1089, 181-198 (1984; Zbl 0552.28011)].