Selectors for dense subsets of function spaces

Abstract

Let USC*p(X) be the topological space of real upper semicontinuous bounded functions defined on X with the subspace topology of the product topology on XR. , are the sets of all upper sequentially dense, upper dense or pointwise dense subsets of USC*p(X), respectively. We prove several equivalent assertions to the assertion USC*p(X) satisfies the selection principles S1(,), including a condition on the topological space X. We prove similar results for the topological space C*p(X) of continuous bounded functions. Similar results hold true for the selection principles Sfin(,).