On the continuity of the inverse in (strongly) paratopological gyrogroups

Abstract

In this paper, we consider the continuity of the inverse in (strongly) paratopological gyrogroups. The conclusions are established as follows: (1) A compact Hausdorff paratopological gyrogroup G is a topological gyrogroup. (2) A Hausdorff locally compact strongly paratopological gyrogroup is a topological gyrogroup. (3) If G is locally compact strongly paratopological gyrocommutative gyrogroup (without any separation restrictions), then G is a strongly topological gyrogroup. (4) Every regular feebly compact strongly paratopological gyrogroup is a topological gyrogroup. (5) If a Hausdorff strongly paratopological gyrogroup G is countablly compact and topologically periodic, then G is a strongly topological gyrogroup.