论文信息 - Disproof of a conjecture about independent branchings in k-connected directed graphs

Disproof of a conjecture about independent branchings in k-connected directed graphs

For each k ≥ 3, we construct a finite directed strongly k-connected graph D containing a vertex t with the following property: For any k spanning t-branchings, B1, …, Bk in D (i. e., each Bi is a spanning tree in D directed toward t), there exists a vertex x ≠ t of D such that the k, x, t-paths in B1, …, Bk are not pairwise openly disjoint. This disproves a well-known conjecture of Frank. © 1995, John Wiley & Sons, Inc.

Andreas Huck | Andreas Huck

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