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A class of quotient spaces in strongly topological gyrogroups

Published 24 Apr 2021 in math.GN | (2104.11877v1)

Abstract: Quotient space is a class of the most important topological spaces in the research of topology. In this paper, we show that if G is a strongly topological gyrogroup with a symmetric neighborhood base U at 0 and H is an admissible subgyrogroup generated from U , then G/H is first-countable if and only if it is metrizable. Moreover, if H is neutral and G/H is Frechet-Urysohn with an {\omega}{\omega}-base, then G/H is first-countable. Therefore, we obtain that if H is neutral, then G/H is metrizable if and only if G/H is Frechet-Urysohn with an {\omega}{\omega}-base. Finally, it is shown that if H is neutral, {\pi}\c{hi}(G/H) = \c{hi}(G/H) and {\pi}{\omega}(G/H) = {\omega}(G/H).

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