On left nilpotent skew braces of class 2
Abstract
The main objective of this article is to initiate a detailed structure theory of left nilpotent skew braces B of class 2, i.e. skew braces with B3 = 0. We prove that if B is of nilpotent type, then B is centrally nilpotent. In fact, we show that B is right nilpotent of class at most 2+mr, i.e. B(2+mr+1) = 0, where m and r are the nilpotency classes of the additive group of B and B2, respectively. If B is of abelian type, then B is actually right nilpotent of class 3, i.e. B(4) = 0, and this bound is best possible.
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