English

Strongly Clean Matrices over Commutative Rings

Rings and Algebras 2013-08-30 v2

Abstract

A commutative ring RR is projective free provided that every finitely generated RR-module is free. An element in a ring is strongly clean provided that it is the sum of an idempotent and a unit that commutates. Let RR be a projective-free ring, and let hR[t]h\in R[t] be a monic polynomial of degree nn. We prove, in this article, that every φMn(R)\varphi\in M_n(R) with characteristic polynomial hh is strongly clean, if and only if the companion matrix ChC_h of hh is strongly clean, if and only if there exists a factorization h=h0h1h=h_0h_1 such that h0S0,h1S1h_0\in {\Bbb S}_0, h_1\in {\Bbb S}_1 and (h0,h1)=1(h_0,h_1)=1. Matrices over power series over projective rings are also discussed. These extend the known results [1, Theorem 12] and [5, Theorem 25].

Keywords

Cite

@article{arxiv.1307.8351,
  title  = {Strongly Clean Matrices over Commutative Rings},
  author = {H. Chen and H. Kose and Y. Kurtulmaz},
  journal= {arXiv preprint arXiv:1307.8351},
  year   = {2013}
}
R2 v1 2026-06-22T01:01:31.329Z