Commuting probability of skew left braces
Abstract
We introduce a concept of the commuting probability of a skew left brace analogous to group theory. We establish upper and lower bounds for the commuting probability and prove that, for finite non-trivial skew left braces, it is always at most 34. Interestingly, there is no skew left brace with commuting probability in the open interval (5/8, 1), except 34, for which we construct an explicit example. A characterization of skew left braces having commuting probability 34 or 58 is presented. We further show that the finite skew left braces with commuting probability larger than 65128 are necessarily nilpotent. We prove that the commuting probability remains invariant under isoclinism of skew braces. We introduce a concept of a compact Hausdorff topological skew left brace B, where we prove that the set of all elements of B having finite centraliser index in B is a Borel subgroup. For such infinite non-trivial skew left braces too 34 is the upper bound for the commuting probability, and 34 is the only rational number which occurs as commuting probability in the open interval (5/8, 1).
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