On the multiplicative group of a two-sided skew brace of solvable type
Abstract
We prove that if (B,+,·) is a two-sided skew brace whose additive group is solvable, then every finite quotient of the multiplicative group (B,·) is solvable. In particular, our result recovers Nasybullov's theorem in the finite case ~[Theorem~4.3(1)]Nas and extends it to arbitrary two-sided skew braces of solvable type.
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