Strong orientation of a connected graph for a crossing family
Abstract
Given a connected graph G=(V,E) and a crossing family C over ground set V such that |δG(U)|≥ 2 for every U∈ C, we prove there exists a strong orientation of G for C, i.e., an orientation of G such that each set in C has at least one outgoing and at least one incoming arc. This implies the main conjecture in Chudnovsky et al. (Disjoint dijoins. Journal of Combinatorial Theory, Series B, 120:18--35, 2016). In particular, in every minimal counterexample to the Edmonds-Giles conjecture where the minimum weight of a dicut is 2, the arcs of nonzero weight must be disconnected.
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