Representations of skew braces

Abstract

In this paper, we explore linear representations of skew left braces, which are known to provide bijective non-degenerate set-theoretical solutions to the Yang--Baxter equation that are not necessarily involutive. A skew left brace (A, ·, ) induces an action λ: (A, ) (A, ·), which gives rise to the group A = (A, ·) λ (A, ). We prove that if A and B are isoclinic skew left braces, then A and B are also isoclinic under some mild restrictions on the centers of the respective groups. Our key observation is that there is a one-to-one correspondence between the set of equivalence classes of irreducible representations of (A, ·, ) and that of the group A. We obtain a decomposition of the induced representation of the additive group (A, ·) and of the multiplicative group (A, ) corresponding to the regular representation of the group A. As examples, we compute the dimensions of the irreducible representations for several skew left braces with prime power orders.