On closed embeddings of free topological algebras

Abstract

Let K be a complete quasivariety of completely regular universal topological algebras of continuous signature E (which means that K is closed under taking subalgebras, Cartesian products, and includes all completely regular topological E-algebras algebraically isomorphic to members of K). For a topological space X by F(X) we denote the free universal E-algebra over X in the class K. Using some extension properties of the Hartman-Mycielski construction we prove that for a closed subspace X of a metrizable (more generally, stratifiable) space Y the induced homomorphism F(X) F(Y) between the respective free universal algebras is a closed topological embedding. This generalizes one result of V.Uspenskii concerning embeddings of free topological groups.