Ordered field valued continuous functions with countable range

Abstract

For a Hausdorff zero-dimensional topological space X and a totally ordered field F with interval topology, let Cc(X,F) be the ring of all F-valued continuous functions on X with countable range. It is proved that if F is either an uncountable field or countable subfield of R, then the structure space of Cc(X,F) is β0X, the Banaschewski Compactification of X. The ideals \Op,Fc:p∈ β0X\ in Cc(X,F) are introduced as modified countable analogue of the ideals \Op:p∈β X\ in C(X). It is realized that Cc(X,F) CK(X,F)=p∈β0XX Op,Fc, this may be called a countable analogue of the well-known formula CK(X)=p∈β XXOp in C(X). Furthermore, it is shown that the hypothesis Cc(X,F) is a Von-Neumann regular ring is equivalent to amongst others the condition that X is a P-space.