Weak countability axioms on the quotient spaces of topological gyrogroups
Abstract
In this paper, we mainly prove that if H is a closed strong subgyrogroup of a strongly topological gyrogroup G and H is neutral, then (1) G/H is biradial if and only if G/H is nested; (2) G/H is metrizable if and only if G/H is a biradial space with countable pseudocharacter; (3) G/H is metrizable if and only if G/H has countable cn-character, given that G/H has the Baire property.
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