Clean Graphs and Idempotent Graphs over Finite Rings: An Approach Based on Zn

Abstract

Let R be a finite ring with identity. The idempotent graph I(R) is the graph whose vertex set consists of the non-trivial idempotent elements of R, where two distinct vertices x and y are adjacent if and only if xy = yx = 0. The clean graph Cl(R) is a graph whose vertices are of the form (e, u), where e is an idempotent element and u is a unit of R. Two distinct vertices (e,u) and (f, v) are adjacent if and only if ef = fe = 0 or uv = vu = 1. The graph Cl2(R) is the subgraph of Cl(R) induced by the set \(e, u) : e is a nonzero idempotent element of R\. In this study, we examine the structure of clean graphs over Zn derived from their Cl2 graphs and investigate their relationship with the structure of their idempotent graphs.