Indecomposable solutions of the Yang-Baxter equation of square-free cardinality

Abstract

Indecomposable involutive non-degenerate set-theoretic solutions (X,r) of the Yang-Baxter equation of cardinality p1·s pn, for different prime numbers p1,…, pn, are studied. It is proved that they are multipermutation solutions of level ≤ n. In particular, there is no simple solution of a non-prime square-free cardinality. This solves a problem stated in [F. Ced\'o, J. Okni\'nski, Constructing finite simple solutions of the Yang-Baxter equation, Adv. Math. 391 (2021), 107968] and provides a far reaching extension of several earlier results on indecomposability of solutions. The proofs are based on a detailed study of the brace structure on the permutation group G(X,r) associated to such a solution. It is proved that p1,…, pn are the only primes dividing the order of G(X,r). Moreover, the Sylow pi-subgroups of G(X,r) are elementary abelian pi-groups and if Pi denotes the Sylow pi-subgroup of the additive group of the left brace G(X,r), then there exists a permutation σ∈ Sn such that Pσ(1), \, Pσ(1)Pσ(2), … , Pσ(1)Pσ(2)·s Pσ(n) are ideals of the left brace G(X,r) and G(X,r)=P1P2·s Pn. In addition, indecomposable solutions of cardinality p1·s pn that are multipermutation of level n are constructed, for every nonnegative integer n.

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