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Conjecture There exists an ineteger 
so that every -arc-connected digraph contains a pair of arc-disjoint strongly connected spanning subdigraphs?
so that every -arc-connected digraph contains a pair of arc-disjoint strongly connected spanning subdigraphs? Bang-Jensen and Yeo [BY] proved the conjecture for several classes like tournaments. There is stronger conjecture for tournaments. Yeo (See [BG, Theorem 13.10.1]) showed that it is NP-complete to decide whether a 2-regular digraph has two arc-disjoint strongly connected spanning subdigraphs.
A similar question can be asked about arc-disjoint out-branching and in-branching. Several related problems are mentioned in the survey of Bang-Jensen and Kriesell [BK].
Bibliography
[BG] J. Bang-Jensen, G. Gutin, Digraphs: Theory, Algorithms and Applications, 2nd. ed., Springer Verlag (2009).
[BK] J. Bang-Jensen, M. Kriesell, Disjoint sub(di)graphs in digraphs, Electronic Notes in Discrete Mathematics 34 (2009), 179-183.
*[BY] J. Bang-Jensen, A. Yeo, Decomposing k-arc-strong tournaments into strong spanning subdigraphs, Combinatorica 24 (2004), 331-349.
* indicates original appearance(s) of problem.
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