Complemented zero-divisor graph of posets

Abstract

In this paper, we derive a set of equivalent conditions for the zero-divisor graph (Q) of a poset Q with 0 to be complemented, characterizing it in terms of quasi-complemented posets. Furthermore, we prove that the notions of a complemented zero-divisor graph and a uniquely complemented zero-divisor graph coincide for any poset Q with 0. In addition, we provide both algebraic and topological characterizations for (Q) to be a complemented graph. In the final section, we apply these characterizations to the zero-divisor graphs of a reduced (multiplicative) semigroup S with 0 and the comaximal (ideal) graph of an Artinian ring R, and the nonzero component union graph UG(V) of a finite-dimensional vector space V over a field F.