English

From $A$ to $B$ to $Z$

Logic 2022-06-23 v1 Group Theory

Abstract

The variety generated by the Brandt semigroup B2{\bf B}_2 can be defined within the variety generated by the semigroup A2{\bf A}_2 by the single identity x2y2y2x2x^2y^2\approx y^2x^2. Edmond Lee asked whether or not the same is true for the monoids B21{\bf B}_2^1 and A21{\bf A}_2^1. We employ an encoding of the homomorphism theory of hypergraphs to show that there is in fact a continuum of distinct subvarieties of A21{\bf A}_2^1 that satisfy x2y2y2x2x^2y^2\approx y^2x^2 and contain B21{\bf B}_2^1. A further consequence is that the variety of B21{\bf B}_2^1 cannot be defined within the variety of A21{\bf A}_2^1 by any finite system of identities. Continuing downward, we then turn to subvarieties of B21{\bf B}_2^1. We resolve part of a further question of Lee by showing that there is a continuum of distinct subvarieties all satisfying the stronger identity x2yyx2x^2y\approx yx^2 and containing the monoid M(z)M({\bf z}_\infty), where z{\bf z}_\infty denotes the infinite limit of the Zimin words z0=x0{\bf z}_0=x_0, zn+1=znxn+1zn{\bf z}_{n+1}={\bf z}_n x_{n+1}{\bf z}_n.

Keywords

Cite

@article{arxiv.2012.14513,
  title  = {From $A$ to $B$ to $Z$},
  author = {Marcel Jackson and Wen Ting Zhang},
  journal= {arXiv preprint arXiv:2012.14513},
  year   = {2022}
}
R2 v1 2026-06-23T21:31:38.345Z