English

Ring Elements of Stable Range One

Rings and Algebras 2024-04-23 v1

Abstract

A ring element aR\,a\in R\, is said to be of {\it right stable range one\/} if, for any tR\,t\in R, aR+tR=R\,aR+tR=R\, implies that a+tb\,a+t\,b\, is a unit in R\,R\, for some bR\,b\in R. Similarly, aR\,a\in R\, is said to be of {\it left stable range one\/} if Ra+Rt=R\,R\,a+R\,t=R\, implies that a+bt\,a+b't\, is a unit in R\,R\, for some bR\,b'\in R. In the last two decades, it has often been speculated that these two notions are actually the same for any aR\,a\in R. In \S3 of this paper, we will prove that this is indeed the case. The key to the proof of this new symmetry result is a certain ``Super Jacobson's Lemma'', which generalizes Jacobson's classical lemma stating that, for any a,bR\,a,b\in R, 1ab\,1-ab\, is a unit in R\,R\, iff so is 1ba\,1-ba. Our proof for the symmetry result above has led to a new generalization of a classical determinantal identity of Sylvester, which will be published separately in [KL3_3]. In \S\S4-5, a detailed study is offered for stable range one ring elements that are unit-regular or nilpotent, while \S6 examines the behavior of stable range one elements via their classical Peirce decompositions. The paper ends with a more concrete \S7 on integral matrices of stable range one, followed by a final \S8 with a few open questions.

Keywords

Cite

@article{arxiv.2404.13251,
  title  = {Ring Elements of Stable Range One},
  author = {Dinesh Khurana and T. Y. Lam},
  journal= {arXiv preprint arXiv:2404.13251},
  year   = {2024}
}

Comments

31 pages

R2 v1 2026-06-28T16:00:30.699Z