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doi:10.1016/j.disc.2004.12.005 
Copyright © 2005 Published by Elsevier B.V.
Note
Disjoint paths in arborescences
Received 16 October 2002;
revised 29 November 2004;
accepted 16 December 2004.
Available online 4 March 2005.
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Abstract
An arborescence in a digraph is a tree directed away from its root. A classical theorem of Edmonds characterizes which digraphs have λ arc-disjoint arborescences rooted at r. A similar theorem of Menger guarantees that λ strongly arc disjoint rv-paths exist for every vertex v, where “strongly” means that no two paths contain a pair of symmetric arcs.
We prove that if a directed graph D contains two arc-disjoint spanning arborescences rooted at r, then D contains two such arborences with the property that for every node v the paths from r to v in the two arborences satisfy Menger's theorem.
Keywords: Disjoint spanning arborescences
