A generalization of Ito's theorem to skew braces
Abstract
The famous theorem of It\o in group theory states that if a group G=HK is the product of two abelian subgroups H and K, then G is metabelian. We shall generalize this to the setting of a skew brace (A,·\,,). Our main result says that if A = BC or A = B C is the product of two trivial sub-skew braces B and C which are both left and right ideals in the opposite skew brace of A, then A is meta-trivial. One can recover It\o's Theorem by taking A to be an almost trivial skew brace.
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