Characterizations of quotient spaces for Lindelöf strongly topological gyrogroups
Abstract
Let L be the class of Lindelöf spaces such that L is closed under finite products. In this paper, we prove that if G ∈ L is a strongly topological gyrogroup, then G is range-metrizable. Furthermore, we prove that if H is a strong subgyrogroup of a strongly topological gyrogroup G ∈ L, then every compact Gδ-set in the quotient space G/H is Dugundji. Finally, for any strongly topological gyrogroup G and any closed strong subgyrogroup N of G, if G ∈ L and the quotient space G/N is locally compact, then the inequality w(G/N) ≤ c is equivalent to the separability of G/N. Our results extend the classical results from topological groups to the class of strongly topological gyrogroups in the literature.
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