Some topology on zero-dimensional subrings of product of rings

Abstract

Let R be a ring and fRigi2I a family of zero-dimensional rings. We define the Zariski topology on Z(R;QRi) and study their basic properties. Moreover, we define a topology on Z(R;QRi) by using ultrafilters; it is called the ultrafilter topology and we demonstrate that this topology is finer than the Zariski topology. We show that the ultrafilter limit point of a collections of subrings of Z(R;QRi) is a zero-dimensional ring. Its relationship with F - lim and the direct limit of a family of rings are studied.