On the Chudnovsky-Seymour-Sullivan Conjecture on Cycles in Triangle-free   Digraphs

Kevin Chen; Sean Karson; Dan Liu; Jian Shen

arXiv:0909.2468·math.CO·September 15, 2009·2 cites

On the Chudnovsky-Seymour-Sullivan Conjecture on Cycles in Triangle-free Digraphs

Kevin Chen, Sean Karson, Dan Liu, Jian Shen

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Abstract

For a simple digraph $G$ without directed triangles or digons, let $β (G)$ be the size of the smallest subset $X \subseteq E (G)$ such that $G ∖ X$ has no directed cycles, and let $γ (G)$ be the number of unordered pairs of nonadjacent vertices in $G$ . In 2008, Chudnovsky, Seymour, and Sullivan showed that $β (G) \leq γ (G)$ , and conjectured that $β (G) \leq γ (G) /2$ . Recently, Dunkum, Hamburger, and P\'or proved that $β (G) \leq 0.88 γ (G)$ . In this note, we prove that $β (G) \leq 0.8616 γ (G)$ .

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TopicsAdvanced Graph Theory Research · Limits and Structures in Graph Theory · Graph theory and applications