The existence of suitable sets in locally compact strongly topological gyrogroups
Abstract
A subset S of a topological gyrogroup G is said to be a suitable set for G if S is discrete, the gyrogroup generated by S is dense in G, and S \0\ is closed in G, where 0 is the identity element of G. In this paper, it is proved that every locally compact strongly topological gyrogroup has a suitable set, which gives an affirmative answer to a question posed by F. Lin, et al. in key14.
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