Common properties of some function rings on a topological space

Abstract

For a nonempty topological space X, the ring of all real-valued functions on X with pointwise addition and multiplication is denoted by F(X) and continuous members of F(X) is denoted by C(X). Let A(X) be a subring of F(X) and B be a non-zero and nonempty subset of A(X). Then we show that there are a subset S of X and a ring homomorphism φ:A(X) A(S) such that ker φ =Ann(B). A lattice ordered subring A(X) of F(X) is called P-convex if every prime ideal of A(X) is an absolutely convex ideal in A(X). Some properties of P-convex subrings of F(X) are investigated. We show that the ring of Baire one functions on X is P-convex. A proper ideal I in A(X) is called a pseudofixed ideal if Z[I]≠ , where Z[I]=\clX f-1(0) | f∈ I\. Some characterizations of pseudofixed ideals in some subrings of F(X) are given. Let X be a completely regular Hausdorff space and let A(X) be a subring of F(X) such that f ∈ A(X) is a unit of A(X) if and only if f-1(0)= and C(X) ⊂eq F(X). Then we show that A(X) is a Gelfand ring and X is compact if and only if every proper ideal of A(X) is pseudofixed.