Antidirected paths in oriented graphs
Abstract
We show that for any integer k 4, every oriented graph with minimum semidegree bigger than 12(k-1+k-3) contains an antidirected path of length k. Consequently, every oriented graph on n vertices with more than (k-1+k-3)n edges contains an antidirected path of length k. This asymptotically proves the antidirected path version of a conjecture of Stein and of a conjecture of Addario-Berry, Havet, Linhares Sales, Reed and Thomass\'e, respectively.
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