L(2,1)-Labeling of the iterated Mycielski of graphs and some related to matching problems

Abstract

In this paper, we study the L(2, 1)-Labeling of the Mycielski and the iterated Mycielski of graphs in general. For a graph G and all t≥ 1, we give sharp bounds for λ(Mt(G)) the L(2, 1)-labeling number of the t-th iterated Mycielski in terms of the number of iterations t, the order n, the maximum degree , and λ(G) the L(2, 1)-labeling number of G. For t=1, we present necessary and sufficient conditions between the 4-star matching number of the complement graph and λ(M(G)) the L(2, 1)-labeling number of the Mycielski of a graph, with some applications to special graphs. For all t≥ 2, we prove that for any graph G of order n, we have 2t-1(n+2)-2≤ λ(Mt(G))≤ 2t(n+1)-2. Thereafter, we characterize the graphs achieving the upper bound 2t(n+1)-2, then by using the Marriage Theorem and Tutte's characterization of graphs with a perfect 2-matching, we characterize all graphs without isolated vertices achieving the lower bound 2t-1(n+2)-2. We determine the L(2, 1)-labeling number for the Mycielski and the iterated Mycielski of some graph classes.