On the Cayley graph of a commutative ring with respect to its zero-divisors

Abstract

Let R be a commutative ring with unity and R+ be Z*(R) be the additive group and the set of all non-zero zero-divisors of R, respectively. We denote by CAY(R) the Cayley graph Cay(R+,Z*(R)). In this paper, we study CAY(R). Among other results, it is shown that for every zero-dimensional non-local ring R, CAY(R) is a connected graph of diameter 2. Moreover, for a finite ring R, we obtain the vertex connectivity and the edge connectivity of CAY(R). We investigate rings R with perfect CAY(R) as well. We also study Reg(CAY(R)) the induced subgraph on the regular elements of R. This graph gives a family of vertex transitive graphs. We show that if R is a Noetherian ring and Reg(CAY(R)) has no infinite clique, then R is finite. Furthermore, for every finite ring R, the clique number and the chromatic number of Reg(CAY(R)) are determined.