More on the rings B1(X) and B1*(X)

Abstract

This paper focuses mainly on the ring of all bounded Baire one functions on a topological space. The uniform norm topology arises from the -norm defined on the collection B1*(X) of all bounded Baire one functions. With respect to this topology, B1*(X) is a topological ring. It is proved that under uniform norm topology, the set of all units forms an open set and as a consequence of it, every maximal ideal of B1*(X) is closed in B1*(X) with uniform norm topology. Since the natural extension of uniform norm topology on B1(X), when B1*(X) ≠ B1(X), does not show up these features, a topology called mB-topology is defined on B1(X) suitably to achieve these results on B1(X). It is proved that the relative mB topology coincides with the uniform norm topology on B1*(X) if and only if B1(X) = B1*(X). Moreover, B1(X) with mB-topology is 1st countable if and only if B1(X) = B1*(X). \\ The last part of the paper establishes a correspondence between the ideals of B1*(X) and a special class of ZB-filters, called eB-filters on a normal topological space X. It is also observed that for normal spaces, the cardinality of the collection of all maximal ideals of B1(X) and those of B1*(X) are the same.