On Structure space of the ring B1(X)

Abstract

In this article, we continue our study of the ring of Baire one functions on a topological space (X,τ), denoted by B1(X) and extend the well known M. H. Stones's theorem from C(X) to B1(X). Introducing the structure space of B1(X), an analogue of Gelfand Kolmogoroff theorem is established. It is observed that (X,τ) may not be embedded inside the structure space of B1(X). This observation inspired us to introduce a weaker form of embedding and show that in case X is a T4 space, X is weakly embedded as a dense subspace, in the structure space of B1(X). It is further established that the ring B1*(X) of all bounded Baire one functions is a C-type ring and also, the structure space of B1*(X) is homeomorphic to the structure space of B1(X). Introducing a finer topology σ than the original T4 topology τ on X, it is proved that B1(X) contains free (maximal) ideals if σ is strictly finer than τ. It is also proved that τ = σ if and only if B1(X) = C(X). Moreover, in the class of all perfectly normal T1 spaces, B1(X) = C(X) is equivalent to the discreteness of the space X.