On Link-irregular labelings of Graphs

Abstract

We introduce the concept of link-irregular labelings for graphs, extending the notion of link-irregular graphs through edge labeling with positive integers. A labeling is link-irregular if every vertex has a uniquely labeled subgraph induced by its neighbors. We establish necessary and sufficient conditions for the existence of such labelings and define the link-irregular labeling number η(G) as the minimum number of distinct labels required. Our main results include necessary and sufficient conditions for the existence of link-irregular labelings. We show that certain families of graphs, such as bipartite graphs, trees, cycles, hypercubes, and complete multipartite graphs, do not admit link-irregular labelings, while complete graphs and wheel graphs do. Specifically, we prove that η(Kn) = 2 for n ≥ 6 and η(Kn) = 3 for n ∈ \3,4,5\. For wheel graphs Wn, we establish that η(Wn) ≈ 2n asymptotically. Finally, we prove that for every positive integer n, there exists a graph with a link-irregular labeling number exactly n, and provide several results on graph operations that preserve labeling numbers.