On λ-homomorphic skew braces

Abstract

For a skew left brace (G, ·, ), the map λ : (G, ) Aut \;(G, ·),~~a λa, where λa(b) = a-1 · (a b) for all a, b ∈ G, is a group homomorphism. Then λ can also be viewed as a map from (G, ·) to Aut\; (G, ·), which, in general, may not be a homomorphism. We study skew left braces (G, ·, ) for which λ : (G, ·) Aut\; (G, ·) is a homomorphism. Such skew left braces will be called λ-homomorphic. We formulate necessary and sufficient conditions under which a given homomorphism λ : (G, ·) Aut\; (G, ·) gives rise to a skew left brace, which, indeed, is λ-homomorphic. As an application, we construct skew left braces when (G, ·) is either a free group or a free abelian group. We prove that any λ-homomorphic skew left brace is an extension of a trivial skew brace by a trivial skew brace. Special emphasis is given on λ-homomorphic skew left brace for which the image of λ is cyclic. A complete characterization of such skew left braces on the free abelian group of rank two is obtained.