Normal Subgyrogroups of Certain Gyrogroups
Abstract
Suppose that (T,) is a groupoid with a left identity such that each element a∈ T has a left inverse. Then T is called a gyrogroup if and only if (i) there exists a function gyr:T× T Aut(T) such that for all a,b,c∈ T, a(b c)= (a b) gyr[a,b]c, where gyr[a,b]c=gyr(a,b)(c); and (ii) for all a,b∈ T, gyr[a,b]=gyr[a b,b]. In this paper, the structure of normal subgyrogroups of certain gyrogroups are investigated.
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