The Topological Fundamental Group and Hoop Earring Spaces

Abstract

The topological fundamental group π1top is a topological invariant that assigns to each space a quasi-topological group and is discrete on spaces which are well behaved locally. For a totally path-disconnected, Hausdorff, unbased space X, we compute the topological fundamental group of the "hoop earring" space of X, which is the reduced suspension of X with disjoint basepoint. We do so by factorizing the quotient map ( X+,x) π1top( X+,x) through a free topological monoid with involution M(X) such that the map M(X) π1top( X+,x) is also a quotient map. π1top( X+,x) is T1 and an embedding X π1top( X+,x) illustrates that π1top( X+,x) is not a topological group when X is not regular. These hoop earring spaces provide a simple class of counterexamples to the claim that π1top is a functor to the category of topological groups.