A minimum degree condition forcing a digraph to be k-linked

Abstract Given a digraph D , let δ 0 ( D ) : = min { δ + ( D ) , δ − ( D ) } be the minimum semi-degree of D . In [D. Kuhn and D. Osthus, Linkedness and ordered cycles in digraphs, submitted] we showed that every sufficiently large digraph D with δ 0 ( D ) ≥ n / 2 + l − 1 is l -linked. The bound on the minimum semi-degree is best possible and confirms a conjecture of Manoussakis [Y. Manoussakis, k -linked and k -cyclic digraphs, J. Combinatorial Theory B 48 (1990) 216-226]. We [D. Kuhn and D. Osthus, Linkedness and ordered cycles in digraphs, submitted] also determined the smallest minimum semi-degree which ensures that a sufficiently large digraph D is k -ordered, i.e. that for every sequence s 1 , … , s k of distinct vertices of D there is a directed cycle which encounters s 1 , … , s k in this order.

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