A minimum semi-degree sufficient condition for one-to-many disjoint path covers in semicomplete digraphs

Abstract

Let D be a digraph. We define the minimum semi-degree of D as δ0(D) := \δ+(D), δ-(D)\. Let k be a positive integer, and let S = \s\ and T = \t1, … ,tk\ be any two disjoint subsets of V(D). A set of k internally disjoint paths joining source set S and sink set T that cover all vertices D are called a one-to-many k-disjoint directed path cover (k-DDPC for short) of D. A digraph D is semicomplete if for every pair x,y of vertices of it, there is at least one arc between x and y. In this paper, we prove that every semicomplete digraph D of sufficiently large order n with δ0(D) ≥ (n+k-1)/2 has a one-to-many k-DDPC joining any disjoint source set S and sink set T, where S = \s\, T = \t1, …, tk\.