English

Groups with $\mathsf A_\ell$-commutator relations

Group Theory 2026-05-08 v2

Abstract

If AA is a unital associative ring and 2\ell \geq 2, then the general linear group GL(,A)\mathrm{GL}(\ell, A) has root subgroups UαU_\alpha and Weyl elements nαn_\alpha for α\alpha from the root system of type A1\mathsf A_{\ell - 1}. Conversely, if an arbitrary group has such root subgroups and Weyl elements for 4\ell \geq 4 satisfying natural conditions, then there is a way to recover the ring AA. We prove a generalization of this result not using the Weyl elements, so instead of the matrix ring M(,A)\mathrm M(\ell, A) we construct a non-unital associative ring with a well-behaved Peirce decomposition.

Keywords

Cite

@article{arxiv.2203.16182,
  title  = {Groups with $\mathsf A_\ell$-commutator relations},
  author = {Egor Voronetsky},
  journal= {arXiv preprint arXiv:2203.16182},
  year   = {2026}
}

Comments

Some misprints are fixed

R2 v1 2026-06-24T10:31:33.298Z