A general approach to transversal versions of Dirac-type theorems

One of the most fundamental questions in graph theory is Mantel‘s theorem which determines the maximum number of edges in a triangle-free graph of a given order. Recently a colorful variant of this problem has been solved. In such a variant we consider $c$ graphs on a common vertex set, thinking of each graph as edges in a~distinct color, and want to determine the smallest number of edges in each color which guarantees the existence of a rainbow triangle. Here, we solve the analogous problem for directed graphs without rainbow triangles, either directed or transitive, for any number of colors. The constructions and proofs essentially differ for $c=3$ and $c \geq 4$ and the type of the forbidden triangle.

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Directed graphs without rainbow triangles

Babiński

Grzesik

Prorok

2023

Proceedings of the 12th European Conference on Combinatorics, Graph Theory and Applications

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A general approach to transversal versions of Dirac-type theorems

Gupta

Hamann

Müyesser

et al. 2023

Proceedings of the 12th European Conference on Combinatorics, Graph Theory and Applications

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Given a collection of hypergraphs $\fH=(H_1, \ldots, H_m)$ with the same vertex set, an $m$-edge graph $F\subset \cup_{i\in [m]}H_i$ is a transversal if there is a bijection $\phi:E(F)\to [m]$ such that $e\in E(H_{\phi(e)})$ for each $e\in E(F)$. How large does the minimum degree of each $H_i$ need to be so that $\fH$ necessarily contains a copy of $F$ that is a transversal? Each $H_i$ in the collection could be the same hypergraph, hence the minimum degree of each $H_i$ needs to be large enough to ensure that $F\subseteq H_i$. Since its general introduction by Joos and Kim~[Bull. Lond. Math. Soc., 2020, 52(3): 498–504], a growing body of work has shown that in many cases this lower bound is tight. In this paper, we give a unified approach to this problem by providing a widely applicable sufficient condition for this lower bound to be asymptotically tight. This is general enough to recover many previous results in the area and obtain novel transversal variants of several classical Dirac-type results for (powers of) Hamilton cycles. For example, we derive that any collection of $rn$ graphs on an $n$-vertex set, each with minimum degree at least $(r/(r+1)+o(1))n$, contains a transversal copy of the $r$-th power of a Hamilton cycle. This can be viewed as a rainbow version of the P\‘osa-Seymour conjecture.

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A general approach to transversal versions of Dirac-type theorems

Cited by 2 publications

References 7 publications

Directed graphs without rainbow triangles

Directed graphs without rainbow triangles

A general approach to transversal versions of Dirac-type theorems

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