Studies of certain classes of functions and its connection with S-embeddedness

Abstract

We call a function f in C(X) to be hard-bounded if f is bounded on every hard subset, a special kind of closed subset, of X. We call a subset T of X to be S-embedded if every hard-bounded continuous function of T can be continuously extended upto X. Every S-embedded subset is C*-embedded. In this paper we have given a characterization of the converse part. To get the converse, we came across a type of function which are bounded away from zero on every hard subset of a subset. We further studied few properties of this type of functions and also of hard-bounded functions.