A merging procedure for labelings of bipartite graphs

Abstract

Let G a bipartite graph with vertex bipartition \A,B\ and let m=|E(G)|. An (A,B)-uniformly ordered labeling of G is a labeling f V→ [0,2m] which, among other conditions, requires that there exists λ∈ N such that f(a) λ and f(b)>λ for all a∈ A and b∈ B. The existence of such a labeling for G implies the existence of a cyclic G-decomposition of K2mx+1 for all positive integers x. In this paper, as a starting point, through this type of labeling we prove the existence of a cyclic G-decomposition in the case that G is a cycle of even length with either one or two pendant paths of any length. Then, through a merging procedure, we are able to get this type of labeling for a specific class of bipartite graphs, which are obtained by iteratively adding an even cycle and a pendant path.