arXiv:2003.06132 Abstract | arXiv Analytics

arXiv:2003.06132 [math.GN]Abstract References Reviews Resources

Submetrizability of strongly topological gyrogroups

Published 2020-03-13Version 1

Topological gyrogroups, with a weaker algebraic structure without associative law, have been investigated recently. We prove that each $T_{0}$-strongly topological gyrogroup is completely regular. We also prove that every $T_{0}$-strongly topological gyrogroup with a countable pseudocharacter is submetrizable. Finally, we prove that the left coset space $G/H$ is submetrizable if $H$ is an admissible $L$-subgyrogroup of a $T_{0}$-strongly topological gyrogroup $G$.

Comments: 11 pages. arXiv admin note: substantial text overlap with arXiv:1911.12938

Categories: math.GN, math.GR

Subjects: 54A20, 11B05, 26A03, 40A05, 40A30, 40A99

Keywords: strongly topological gyrogroup, submetrizability, weaker algebraic structure, left coset space, countable pseudocharacter

Related articles: Most relevant | Search more

arXiv:2104.11877 [math.GN] (Published 2021-04-24)

A class of quotient spaces in strongly topological gyrogroups

Meng Bao, Jie Wang, Xiaoquan Xu

arXiv:2204.02079 [math.GN] (Published 2022-04-05)

Quotient spaces with strong subgyrogroups

Meng Bao, Xuewei Ling, Xiaoquan Xu

arXiv:2003.08843 [math.GN] (Published 2020-03-18)

Quotient with respect to admissible $L$-subgyrogroups

Meng Bao, Fucai Lin

arXiv Analytics

arXiv:2003.06132 [math.GN]Abstract References Reviews Resources

Submetrizability of strongly topological gyrogroups

Links

Toolbox

arXiv:2003.06132 [math.GN]AbstractReferencesReviewsResources

Submetrizability of strongly topological gyrogroups

Links

Toolbox

arXiv:2003.06132 [math.GN]Abstract References Reviews Resources