English

Linear functions preserving Green's relations over fields

Rings and Algebras 2020-07-20 v1

Abstract

We study linear functions on the space of n×nn \times n matrices over a field which preserve or strongly preserve each of Green's equivalence relations (L\mathcal{L}, R\mathcal{R}, H\mathcal{H} and J\mathcal{J}) and the corresponding pre-orders. For each of these relations we are able to completely describe all preservers over an algebraically closed field (or more generally, a field in which every polynomial of degree nn has a root), and all strong preservers and bijective preservers over any field. Over a general field, the non-zero J\mathcal{J}-preservers are all bijective and coincide with the bijective rank-11 preservers, while the non-zero H\mathcal{H}-preservers turn out to be exactly the invertibility preservers, which are known. The L\mathcal{L}- and R\mathcal{R}-preservers over a field with "few roots" seem harder to describe: we give a family of examples showing that they can be quite wild.

Keywords

Cite

@article{arxiv.2007.09054,
  title  = {Linear functions preserving Green's relations over fields},
  author = {Alexander Guterman and Marianne Johnson and Mark Kambites and Artem Maksaev},
  journal= {arXiv preprint arXiv:2007.09054},
  year   = {2020}
}

Comments

21 pages

R2 v1 2026-06-23T17:12:00.932Z