Strongly topologically orderable gyrogroups with a suitable set
Abstract: A discrete subset $S$ of a topologically gyrogroup $G$ is called a {\it suitable set} for $G$ if $S\cup {1}$ is closed and the subgyrogroup generated by $S$ is dense in $G$, where $1$ is the identity element of $G$. In this paper, we mainly prove that every strongly topologically orderable gyrogroup is either metrizable or has a totally ordered local base $\mathcal{H}$ at the identity element, consisting of clopen $L$-gyrosubgroups, such that $gyrx, y=H$ for any $x, y\in G$ and $H\in \mathcal{H}$. Moreover, we prove that every strongly topologically orderable gyrogroup is hereditarily paracompact. Furthermore, we show that every locally compact or not totally disconnected strongly topologically orderable gyrogroup contains a suitable set. Finally, we prove that if a strongly topologically orderable gyrogroup has a (closed) suitable set, then its dense subgyrogroup also has a (closed) suitable set.
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