English

The set-theoretic Yang-Baxter equation, Kimura semigroups and functional graphs

Quantum Algebra 2025-07-14 v3 Combinatorics Group Theory Rings and Algebras

Abstract

We prove that the category of solutions of the set-theoretic Yang-Baxter equation of Frobenius-Separability (FS) type is equivalent to the category of pointed Kimura semigroups. As applications, all involutive, idempotent, nondegenerate, surjective, finite order, unitary or indecomposable solutions of FS type are classified. For instance, if X=n|X| = n, then the number of isomorphism classes of all such solutions on XX that are (a) left non-degenerate, (b) bijective, (c) unitary or (d) indecomposable and left-nondegenerate is: (a) the Davis number d(n)d(n), (b) mnp(m)\sum_{m|n} \, p(m), where p(m)p(m) is the Euler partition number, (c) τ(n)+dnd2\tau(n) + \sum_{d|n}\left\lfloor \frac d2\right\rfloor, where τ(n)\tau(n) is the number of divisors of nn, or (d) the Harary number c(n)\mathfrak{c} (n). The automorphism groups of such solutions can also be recovered as automorphism groups Aut(f)\mathrm{Aut}(f) of sets XX equipped with a single endo-function f:XXf:X\to X. We describe all groups of the form Aut(f)\mathrm{Aut}(f) as iterations of direct and (possibly infinite) wreath products of cyclic or full symmetric groups, characterize the abelian ones as products of cyclic groups, and produce examples of symmetry groups of FS solutions not of the form Aut(f)\mathrm{Aut}(f).

Keywords

Cite

@article{arxiv.2303.06700,
  title  = {The set-theoretic Yang-Baxter equation, Kimura semigroups and functional graphs},
  author = {A. L. Agore and A. Chirvasitu and G. Militaru},
  journal= {arXiv preprint arXiv:2303.06700},
  year   = {2025}
}

Comments

Final version; to appear in Research in the Mathematical Sciences

R2 v1 2026-06-28T09:12:59.707Z