English

Strongly Clean Matrix Rings Over Commutative Rings

Rings and Algebras 2008-08-20 v3

Abstract

A ring RR is called strongly clean if every element of RR is the sum of a unit and an idempotent that commute. By {\rm SRC} factorization, Borooah, Diesl, and Dorsey \cite{BDD051} completely determined when Mn(R){\mathbb M}_n(R) over a commutative local ring RR is strongly clean. We generalize the notion of {\rm SRC} factorization to commutative rings, prove that commutative nn-{\rm SRC} rings (n2)(n\ge 2) are precisely the commutative local rings over which Mn(R){\mathbb M}_n(R) is strongly clean, and characterize strong cleanness of matrices over commutative projective-free rings having {\rm ULP}. The strongly π\pi-regular property (hence, strongly clean property) of Mn(C(X,C)){\mathbb M}_n(C(X,{\mathbb C})) with XX a {\rm P}-space relative to C{\mathbb C} is also obtained where C(X,C)C(X,{\mathbb C}) is the ring of complex valued continuous functions.

Keywords

Cite

@article{arxiv.0803.2176,
  title  = {Strongly Clean Matrix Rings Over Commutative Rings},
  author = {Lingling Fan and Xiande Yang},
  journal= {arXiv preprint arXiv:0803.2176},
  year   = {2008}
}
R2 v1 2026-06-21T10:21:37.527Z