The 2-Ranking Numbers of Graphs

Abstract

In a graph whose vertices are assigned integer ranks, a path is well-ranked if the endpoints have distinct ranks or some interior point has a higher rank than the endpoints. A ranking is an assignment of ranks such that all nontrivial paths are well-ranked. A k-ranking is a relaxation in which all nontrivial paths of length at most k are well-ranked. The k-ranking number of a graph G is the minimum t such that there is a k-ranking of G using ranks in \1,…,t\. We prove that the 2-ranking number of the n-dimensional hypercube Qn is n+1. As a corollary, we improve the bounds on the star chromatic number of products of cycles when each cycle has length divisible by 4. For m n, we show that the 2-ranking number of Km Kn is (n m) and O(nm2(3)-1) with an asymptotic result when m is constant and an exact result when m! divides n. We prove that every subcubic graph has 2-ranking number at most 7, and we also prove the existence of a graph with maximum degree k and 2-ranking number (k2/(k)).