On -Frechet-Urysohn topological groups
Abstract
We characterize -Fr\'echet--Urysohn topological groups. Using this characterization we show that: (1) a hemicompact topological group is -Fr\'echet--Urysohn iff it is locally compact, and (2) if F is a closed metrizable subspace of a topological vector space (tvs) E such that the quotient E/F is a -Fr\'echet--Urysohn space, then also E is a -Fr\'echet--Urysohn space. Consequently, the product of a -Fr\'echet--Urysohn tvs and a metrizable tvs is a -Fr\'echet--Urysohn space. Under Martin's Axiom, we construct a countable Boolean -Fr\'echet--Urysohn group which is not a k R-space.
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