Some characterizations of ω-balanced topological groups with a q-point

Abstract

In this paper, we study some characterizations of q-spaces, strict q-spaces and strong q-spaces under ω-balanced topological groups as follows: (1) A topological group G is ω-balanced and a q-space if and only if for each open neighborhood O of the identity in G, there is a countably compact invariant subgroup H which is of countable character in G, such that H ⊂eq O and the canonical quotient mapping p:G→ G/H is quasi-perfect and the quotient group G/H is metrizable. (2) A topological group G is ω-balanced and a strict q-space if and only if for each open neighborhood O of the identity in G, there is a closed sequentially compact invariant subgroup H which is of countable character in G, such that H ⊂eq O and the canonical quotient mapping p:G→ G/H is sequential-perfect and the quotient group G/H is metrizable. (3) A topological group G is ω-balanced and a strong q-space if and only if for each open neighborhood O of the identity in G, there is a closed sequentially compact invariant subgroup H of countable character \Vn:n∈ ω\ , such that H ⊂eq O and \Vn:n∈ω\ is a strong q-sequence at each y∈ H , in G such that the canonical quotient mapping p:G→ G/H is strongly sequential-perfect and the quotient group G/H is metrizable.

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