A minimum semi-degree condition for unpaired many-to-many disjoint path covers in digraphs

Abstract

For a digraph D, let δ0(D) = \δ+(D), δ-(D)\ be the minimum semi-degree of D. A set of k vertex-disjoint paths, \P1, …, Pk\, joining a disjoint source set S = \s1, …, sk\ and sink set T = \t1, …, tk\ is called an unpaired many-to-many k-disjoint directed path cover (k-DDPC for short) of D, if each Pj joins sj and tσ(j) for some permutation σ on \1, … , k\ and kj=1 V(Pj) = V(D). In this paper, we give a new proof for the following result that every digraph D with δ0(D) ≥ (n+k) / 2 has an unpaired many-to-many k-DDPC joining any disjoint source set S and sink set T, where S = \s1, …, sk\ and T = \t1, …, tk\. Moreover, we show that the bound on the minimum semi-degree is best possible when n ≥ 3k.