Disjoint paths in unions of tournaments

Abstract

Given k pairs of vertices (si,ti)\;(1 i k) of a digraph G, how can we test whether there exist vertex-disjoint directed paths from si to ti for 1 i k? This is NP-complete in general digraphs, even for k = 2, but in an earlier paper we proved that for all fixed k, there is a polynomial-time algorithm to solve the problem if G is a tournament (or more generally, a semicomplete digraph). Here we prove that for all fixed k there is a polynomial-time algorithm to solve the problem when V(G) is partitioned into a bounded number of sets each inducing a semicomplete digraph (and we are given the partition).