Construction of All Gyrogroups of Orders at most 31

Abstract

The gyrogroup is the closest algebraic structure to the group ever discovered. It has a binary operation containing an identity element such that each element has an inverse. Furthermore, for each pair (a,b) of elements of this structure there exists an automorphism a,b with this property that left associativity and left loop property are satisfied. Since each gyrogroup is a left Bol loop, some results of Burn imply that all gyrogroups of orders p, 2p and p2 are groups. The aim of this paper is to classify gyrogroups of orders 8, 12, 15, 18, 20, 21, and 28.