On the non-zero divisor graph of the Hamilton quaternions over Z2n

Abstract

Let R be a ring with unity. The non-zero divisor graph of R, Φ(R), is the graph with vertex set R \0,1,-1\, and two vertices x and y are adjacent if and only if either xy or yx is non-zero. In this article we associate Φ(R) to the ring of Hamilton quaternions over Z2n, H( Z2n). The detailed structure of the elements in H( Z2n) is presented, based on which various structural properties of the graph Φ( H( Z2n)), such as connectedness, adjacency of vertices, traversability, and planarity, are studied. Furthermore, we derive bounds for clique number and chromatic number.