Every finite perfect two-sided skew brace decomposes as a central product of an almost trivial skew brace and a trivial skew brace, both arising from perfect groups, with perfectness equivalent for the brace and either underlying group.
Nasybullov,Connections between properties of the additive and the multiplicative groups of a two-sided skew brace, J
2 Pith papers cite this work. Polarity classification is still indexing.
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Pith papers citing it
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2026 2verdicts
UNVERDICTED 2representative citing papers
The variety of skew braces is not action accessible.
citing papers explorer
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On finite perfect two-sided skew braces
Every finite perfect two-sided skew brace decomposes as a central product of an almost trivial skew brace and a trivial skew brace, both arising from perfect groups, with perfectness equivalent for the brace and either underlying group.
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Action accessibility in the variety of skew braces
The variety of skew braces is not action accessible.