On semi-transitive orientability of Kneser graphs and their complements

Abstract

An orientation of a graph is semi-transitive if it is acyclic, and for any directed path v0→ v1→ ·s→ vk either there is no edge between v0 and vk, or vi→ vj is an edge for all 0≤ i<j≤ k. An undirected graph is semi-transitive if it admits a semi-transitive orientation. Semi-transitive graphs include several important classes of graphs such as 3-colorable graphs, comparability graphs, and circle graphs, and they are precisely the class of word-representable graphs studied extensively in the literature. In this paper, we study semi-transitive orientability of the celebrated Kneser graph K(n,k), which is the graph whose vertices correspond to the k-element subsets of a set of n elements, and where two vertices are adjacent if and only if the two corresponding sets are disjoint. We show that for n≥ 15k-24, K(n,k) is not semi-transitive, while for k≤ n≤ 2k+1, K(n,k) is semi-transitive. Also, we show computationally that a subgraph S on 16 vertices and 36 edges of K(8,3), and thus K(8,3) itself on 56 vertices and 280 edges, is non-semi-transitive. S and K(8,3) are the first explicit examples of triangle-free non-semi-transitive graphs, whose existence was established via Erdos' theorem by Halld\'orsson et al. in 2011. Moreover, we show that the complement graph K(n,k) of K(n,k) is semi-transitive if and only if n≥ 2k.