Edmonds' Branching Theorem in Digraphs without Forward-infinite Paths

Abstract

Let D be a finite digraph, and let V0,…,Vk-1 be nonempty subsets of V(D) . The (strong form of) Edmonds' branching theorem states thatthere are pairwise edge-disjoint spanning branchings B0,…, Bk-1 in D such that the root set of Bi is Vi\ (i=0,…,k-1) if and only if for all ≠ X⊂eq V(D) the number of ingoing edges of X is greater than or equal to the number of sets Vi disjoint from X . As was shown by R. Aharoni and C. Thomassen in aharoni1989infinite, this theorem does not remain true for infinite digraphs. Thomassen also proved that for the class of digraphs without backward-infinite paths, the above theorem of Edmonds remains true. Our main result is that for digraphs without forward-infinite paths, Edmonds' branching theorem remains true as well.