\(H\)-enrichments of topologies (Q1183644)

An \(H\)-enrichment of a topology \(t\) on a set \(X\) is a finer topology \(t'\) such that each \(t\)-homeomorphism of \(X\) to itself is also a \(t'\)- homeomorphism. This concept arose from earlier work of the authors on minimally free rings of continuous real-valued functions, but the focus here is purely topological. For example, their results give conditions that permit or prohibit the existence of \(H\)-enrichments that satisfy certain separation and connectedness axioms.