A quantitative generalization of Prodanov-Stoyanov Theorem on minimal Abelian topological groups

Abstract

A topological group X is defined to have compact exponent if for some number n∈ N the set \xn:x∈ X\ has compact closure in X. Any such number n will be called a compact exponent of X. Our principal result states that a complete Abelian topological group X has compact exponent (equal to n∈ N) if and only if for any injective continuous homomorphism f:X Y to a topological group Y and every y∈ f(X) there exists a positive number k (equal to n) such that yk∈ f(X). This result has many interesting implications: (1) an Abelian topological group is compact if and only if it is complete in each weaker Hausdorff group topology; (2) each minimal Abelian topological group is precompact (this is the famous Prodanov-Stoyanov Theorem); (3) a topological group X is complete and has compact exponent if and only if it is closed in each Hausdorff paratopological group containing X as a topoloical subgroup (this confirms an old conjecture of Banakh and Ravsky).