On the Spanier Groups and Covering and Semicovering Spaces

Abstract

For a connected, locally path connected space X, let H be a subgroup of the fundamental group of X, π1(X,x). We show that there exists an open cover U of X such that H contains the Spanier group π(,x) if and only if the core of H in π1(X,x) is open in the quasitopological fundamental group π1qtop(X,x) or equivalently it is open in the topological fundamental group π1τ(X,x). As a consequence, using the relation between the Spanier groups and covering spaces, we give a classification for connected covering spaces of X based on the conjugacy classes of subgroups with open core in π1qtop(X,x). Finally, we give a necessary and sufficient condition for the existence of a semicovering. Moreover, we present a condition under which every semicovering of X is a covering.