On the nonorientable genus of the generalized unit and unitary Cayley graphs of a commutative ring

Abstract

Let R be a commutative ring and let U(R) be multiplicative group of unit elements of R. In 2012, Khashyarmanesh et al. defined generalized unit and unitary Cayley graph, (R, G, S), corresponding to a multiplicative subgroup G of U(R) and a non-empty subset S of G with S-1=\s-1 s∈ S\⊂eq S, as the graph with vertex set R and two distinct vertices x and y are adjacent if and only if there exists s∈ S such that x+sy ∈ G. In this paper, we characterize all Artinian rings R whose (R,U(R), S) is projective. This leads to determine all Artinian rings whose unit graphs, unitary Cayley garphs and co-maximal graphs are projective. Also, we prove that for an Artinian ring R whose (R, U(R), S) has finite nonorientable genus, R must be a finite ring. Finally, it is proved that for a given positive integer k, the number of finite rings R whose (R, U(R), S) has nonorientable genus k is finite.