Solutions to the linkage conjecture in tournaments

Abstract

A digraph D is k-linked if for every 2k-tuple x1,… , xk, y1, … , yk of distinct vertices in D, there exist k pairwise vertex-disjoint paths P1,…, Pk such that Pi starts at xi and ends at yi, i∈ [k]. In 2015, Pokrovskiy conjectured that there exists a function g(k) such that every 2k-connected tournament with minimum in-degree and minimum out-degree at least g(k) is k-linked in [J. Comb. Theory, Ser. B 115 (2015) 339--347]. In this paper, we disprove this conjecture by constructing a family of counterexamples. The counterexamples also provide a negative answer to the question raised by Gir\~ao, Popielarz, Snyder in [Combinatorica 41 (2021) 815--837]. Further, we prove that every (2k+1)-connected semicomplete digraph D with minimum out-degree at least 107k4 is k-linked, which refines and generalizes the early result of Gir\~ao, Popielarz, Snyder.

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