Greedoids from flames

Abstract

A digraph D with r∈ V(D) is an r -flame if for every v∈ V(D)-r , the in-degree of v is equal to the local edge-connectivity λD(r,v) . We show that for every digraph D and r∈ V(D) , the edge sets of the r -flame subgraphs of D form a greedoid. Our method yields a new proof of Lov\'asz' theorem stating: for every digraph D and r∈ V(D) , there is an r -flame subdigraph F of D such that λF(r,v) =λD(r,v) for v∈ V(D)-r . We also give a strongly polynomial algorithm to find such an F working with a fractional generalization of Lov\'asz' theorem.