Advertive topological algebras (Q2765255)

Let \(A\) be a topological algebra with separately continuous multiplication. The topological radical rad \(A\) of a topological algebra \(A\) has been defined and studied by the author in [Math. Stud., Tartu 1, 25--31 (2001; Zbl 1044.46039), see the following review]. \(A\) is an advertive topological algebra if the set of topologically quasi-invertible elements of \(A\) coincides with the set of quasi-invertible elements of \(A\). The class of advertive algebras contains all Q-algebras, all complete locally \(m\)-pseudoconvex algebras, and all topological algebras with functional spectrum. If \(A\) is a commutative topologically nonradical simplicial Gelfand-Mazur algebra, then the set hom \(A\) is not empty. If \(A\) is a Hausdorff complex algebra and if completion of \(A\) is a Q-algebra, then the classes of topological Q-algebras, advertive topological algebras, and advertible complete algebras coincide.NEWLINENEWLINEFor the entire collection see [Zbl 0969.00059].