English

Groups with $\mathsf{BC}_\ell$-commutator relations

Group Theory 2026-05-08 v2

Abstract

Isotropic odd unitary groups generalize Chevalley groups of classical types over commutative rings and their twisted forms. Such groups have root subgroups parameterized by a root system BC\mathsf{BC}_\ell and may be constructed by so-called odd form rings with Peirce decompositions. We show the converse: if a group GG has root subgroups indexed by roots of BC\mathsf{BC}_\ell and satisfying natural conditions, then there is a homomorphism StU(R,Δ)G\mathrm{StU}(R, \Delta) \to G inducing isomorphisms on the root subgroups, where StU(R,Δ)\mathrm{StU}(R, \Delta) is the odd unitary Steinberg group constructed by an odd form ring (R,Δ)(R, \Delta) with a Peirce decomposition. For groups with root subgroups indexed by A\mathsf A_\ell (the already known case) the resulting odd form ring is essentially a generalized matrix ring.

Keywords

Cite

@article{arxiv.2308.01225,
  title  = {Groups with $\mathsf{BC}_\ell$-commutator relations},
  author = {Egor Voronetsky},
  journal= {arXiv preprint arXiv:2308.01225},
  year   = {2026}
}

Comments

minor corrections

R2 v1 2026-06-28T11:46:33.375Z