Some generalizations and unifications of CK(X), C(X) and C∞(X)

Abstract

Let P be an open filter base for a filter F on X. We denote by CP(X) (C∞P(X)) the set of all functions f∈ C(X) where Z(f) (\x: |f(x)|< 1n\) contains an element of P. First, we observe that every proper subrings in the sense of Acharyya and Ghosh (Topology Proc. 2010) has such form and vice versa. After wards, we generalize some well known theorems about CK(X), C(X) and C∞(X) for CP(X) and C∞P(X). We observe that C∞P(X) may not be an ideal of C(X). It is shown that C∞P(X) is an ideal of C(X) and for each F∈F, X F is bounded the set of non-cluster points of the filter F is bounded. By this result, we investigate topological spaces for which C∞P(X) is an ideal of C(X) whenever P=\A⊂neq X: A is open and X A is bounded \ (resp., P=\A⊂neq X: X A is finite \). Moreover, we prove that CP(X) is an essential (resp., free) ideal the set \V: V is open and X V∈F\ is a π-base for X (resp., F has no cluster point). Finally, the filter F for which C∞P(X) is a regular ring (resp., z-ideal) is characterized.