English

The M-Regular Graph of a Commutative Ring

Commutative Algebra 2013-07-30 v2 Combinatorics

Abstract

Let RR be a commutative ring and MM be an RR-module, and let Z(M)Z(M) be the set of all zero-divisors on MM. In 2008, D.F. Anderson and A. Badawi introduced the regular graph of RR. In this paper, we generalize the regular graph of RR to the \textit{MM-regular graph} of RR, denoted by MM-Reg(Γ(R))Reg(\Gamma(R)). It is the undirected graph with all MM-regular elements of RR as vertices, and two distinct vertices xx and yy are adjacent if and only if x+yZ(M)x+y\in Z(M). The basic properties and possible structures of the MM-Reg(Γ(R))Reg(\Gamma(R)) are studied. We determine the girth of the MM-regular graph of RR. Also, we provide some lower bounds for the independence number and the clique number of the MM-Reg(Γ(R))Reg(\Gamma(R)). Among other results, we prove that for every Noetherian ring RR and every finitely generated module MM over RR, if 2Z(M)2\notin Z(M) and the independence number of the MM-Reg(Γ(R))Reg(\Gamma(R)) is finite, then RR is finite.

Keywords

Cite

@article{arxiv.1305.6199,
  title  = {The M-Regular Graph of a Commutative Ring},
  author = {M. J. Nikmehr and F. Heydari},
  journal= {arXiv preprint arXiv:1305.6199},
  year   = {2013}
}

Comments

This paper has been withdrawn by the author because of some typos and errors in the proofs

R2 v1 2026-06-22T00:23:07.972Z