L(2,1)-labelling of Circular-arc Graph

Abstract

An L(2,1)-labelling of a graph G=(V, E) is λ2,1(G) a function f from the vertex set V (G) to the set of non-negative integers such that adjacent vertices get numbers at least two apart, and vertices at distance two get distinct numbers. The L(2,1)-labelling number denoted by λ2,1(G) of G is the minimum range of labels over all such labelling. In this article, it is shown that, for a circular-arc graph G, the upper bound of λ2,1(G) is +3ω, where and ω represents the maximum degree of the vertices and size of maximum clique respectively.