# On semi-transitive orientability of Kneser graphs and their complements

**Authors:** Sergey Kitaev, Akira Saito

arXiv: 1903.02777 · 2019-03-08

## TL;DR

This paper investigates the semi-transitive orientability of Kneser graphs and their complements, establishing parameter ranges for semi-transitivity and providing explicit examples of non-semi-transitive graphs, including triangle-free cases.

## Contribution

It characterizes when Kneser graphs and their complements are semi-transitive, and provides the first explicit examples of triangle-free non-semi-transitive graphs.

## Key findings

- K(n,k) is not semi-transitive for n ≥ 15k-24.
- K(n,k) is semi-transitive for k ≤ n ≤ 2k+1.
- Explicit triangle-free non-semi-transitive graphs are constructed.

## Abstract

An orientation of a graph is semi-transitive if it is acyclic, and for any directed path $v_0\rightarrow v_1\rightarrow \cdots\rightarrow v_k$ either there is no edge between $v_0$ and $v_k$, or $v_i\rightarrow v_j$ is an edge for all $0\leq i<j\leq k$. 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 $n\geq 15k-24$, $K(n,k)$ is not semi-transitive, while for $k\leq n\leq 2k+1$, $K(n,k)$ 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 Erd\H{o}s' theorem by Halld\'{o}rsson et al. in 2011. Moreover, we show that the complement graph $\overline{K(n,k)}$ of $K(n,k)$ is semi-transitive if and only if $n\geq 2k$.

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## References

13 references — full list in the complete paper: https://tomesphere.com/paper/1903.02777/full.md

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Source: https://tomesphere.com/paper/1903.02777