o-Boundedness of free topological groups
Abstract
Assuming the absence of Q-points (which is consistent with ZFC) we prove that the free topological group F(X) over a Tychonov space X is o-bounded if and only if every continuous metrizable image T of X satisfies the selection principle Ufin(O,) (the latter means that for every sequence <un>n∈ w of open covers of T there exists a sequence <vn>n∈ w such that vn∈ [un]<w and for every F∈ [X]<w there exists n∈ w with F⊂ vn). This characterization gives a consistent answer to a problem posed by C. Hernandes, D. Robbie, and M. Tkachenko in 2000.
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