Some new results on functions in C(X) having their support on ideals of closed sets

Abstract

For any ideal P of closed sets in X, let CP(X) be the family of those functions in C(X) whose support lie on P. Further let CP∞(X) contain precisely those functions f in C(X) for which for each ε >0, \x∈ X: f(x)≥ ε\ is a member of P. Let CPX stand for the set of all those points p in β X at which the stone extension f* for each f in CP(X) is real valued. We show that each realcompact space lying between X and β X is of the form CPX if and only if X is pseudocompact. We find out conditions under which an arbitrary product of spaces of the form locally-P/ almost locally-P, becomes a space of the same form. We further show that CP(X) is a free ideal ( essential ideal ) of C(X) if and only if CP∞(X) is a free ideal ( respectively essential ideal ) of C*(X)+CP∞(X) when and only when X is locally-P ( almost locally-P). We address the problem, when does CP(X)/CP∞(X) become identical to the socle of the ring C(X). Finally we observe that the ideals of the form CP(X) of C(X) are no other than the z-ideals of C(X).