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Clique number of tournaments

2 Pith papers cite this work. Polarity classification is still indexing.

2 Pith papers citing it
abstract

Given a digraph $D$ together with an ordering $\prec$ of its vertices, the \emph{backedge graph} of $D$ with respect to $\prec$ is the undirected graph $D^{\prec}$ with the same vertex set as $D$, where $xy \in E(D^{\prec})$ if $xy \in A(D)$ and $y \prec x$. We introduce the notion of the \emph{clique number of a digraph} $D$, defined as the minimum clique number over all backedge graphs of $D$. We investigate its relationship with the dichromatic number. In particular, this concept allows us to define $\dic$-bounded classes of digraphs, which constitute the main topic of this paper, with a primary focus on tournaments. A class of tournaments is $\dic$-bounded if, for every tournament in the class, its dichromatic number is bounded by a function of its clique number. We study for which tournaments $H$ the class of $H$-free tournaments is $\dic$-bounded, and prove in particular that $H$ must have a backedge graph that is a forest. We prove that if a class of tournaments is $\dic$-bounded, then so is its closure under substitution. We also explore the relationship between $\dic$-bounded classes of tournaments and certain conjectures on tournaments. We prove that a $\dic$-bounded class of tournaments satisfies the $BIG \Rightarrow BIG$ Conjecture, and that a polynomially $\dic$-bounded class of tournaments satisfies the (tournament) Erd\H{o}s-Hajnal Conjecture.

fields

math.CO 2

years

2026 1 2024 1

verdicts

UNVERDICTED 2

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representative citing papers

Computing the degreewidth of a digraph is hard

math.CO · 2024-07-27 · unverdicted · novelty 8.0

Proves NP-hardness of determining if an oriented graph has degreewidth at most 1, settling the last open case for oriented graphs.

Decomposing tournaments into comparability graphs

math.CO · 2026-06-05 · unverdicted · novelty 7.0

Defines pod(D) as the minimum partial-order arc cover size and proves dic(D) ≤ diomega(D)^pod(D) for digraphs, yielding polynomial dic-bounds for bounded-pod classes and resolving a conjecture on directed cliques in tournaments.

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Showing 1 of 1 citing paper after filters.

  • Computing the degreewidth of a digraph is hard math.CO · 2024-07-27 · unverdicted · none · ref 2 · internal anchor

    Proves NP-hardness of determining if an oriented graph has degreewidth at most 1, settling the last open case for oriented graphs.