L(2, 1)-labeling of some zero-divisor graphs associated with commutative rings

Abstract

Let G = (V, E) be a simple graph, an L(2,1)-labeling of G is an assignment of labels from nonnegative integers to vertices of G such that adjacent vertices get labels which differ by at least by two, and vertices which are at distance two from each other get different labels. The λ-number of G, denoted by λ(G), is the smallest positive integer such that G has an L(2,1)-labeling with all labels as members of the set \0,1, …,\. The zero-divisor graph of a finite commutative ring R with unity, denoted by (R), is the simple graph whose vertices are all zero divisors of R in which two vertices u and v are adjacent if and only if uv = 0 in R. In this paper, we investigate L(2,1)-labeling of some zero-divisor graphs. We study the partite truncation, a graph operation that allows us to obtain a reduced graph of relatively small order from a graph of significantly larger order. We establish the relation between λ-numbers of the graph and its partite truncated one. We make use of the operation partite truncation to contract the zero-divisor graph of a reduced ring to the zero-divisor graph of a Boolean ring.