On products of abelian skew braces
Abstract
The main objective of this paper is to study factorisations of skew left braces through abelian subbraces. We prove a skew brace theoretical analog of the classical It\o's theorem about product of two abelian groups: if B = A1A2 is a skew brace which is the product of two abelian skew subbraces A1 and A2, and A1 is a left and right ideal of B, then the commutator ideal [B, B]B of B is an abelian brace. If A1 is a left (non-necessarily right) ideal of B, we show that there exists a strong left ideal of B contained in A1 or A2. We also show factorisations of relevant ideals of factorised braces that are sums and products of abelian subbraces.
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