On Disjunctive and Conjunctive Set-Labelings of Graphs

Abstract

Let X be a non-empty set and (X) be its power set. A set-valuation or a set-labeling of a given graph G is an injective function f:V(G) (X) such that the induced function f:E(G) (X) defined by f (uv) = f(u) f(v), where is a binary operation on sets. A set-indexer of a graph G is an injective set-valued function f:V(G) (X) such that the induced function f:E(G) (X) is also injective. In this paper, two types of set-labelings, called conjunctive set-labeling and disjunctive set-labeling, of graphs are introduced and some properties and characteristics of these types of set-labelings of graphs are studied.