On packing spanning arborescences with matroid constraint

Let D = (V + s, A) be a digraph with a designated root vertex S. Edmonds’ seminal result (see J. Edmonds [4]) implies that D has a packing of k spanning s-arborescences if and only if D has a packing of k (s, t)-paths for all t ∈ V, where a packing means arc-disjoint subgraphs. Let M be a matroid on the set of arcs leaving S. A packing of (s,t) -paths is called M-based if their arcs leaving S form a base of M while a packing of s-arborescences is called M -based if, for all t ∈ V, the packing of (s, t) -paths provided by the arborescences is M -based. Durand de Gevigney, Nguyen, and Szigeti proved in [3] that D has an M-based packing of s -arborescences if and only if D has an M-based packing of (s,t) -paths for all t ∈ V. Berczi and Frank conjectured that this statement can be strengthened in the sense of Edmonds’ theorem such that each S -arborescence is required to be spanning. Specifically, they conjectured that D has an M -based packing of spanning S -arborescences if and only if D has an M -based packing of (s,t) -paths for all t ∈ V. In this paper we disprove this conjecture in its general form and we prove that the corresponding decision problem is NP-complete. We also prove that the conjecture holds for several fundamental classes of matroids, such as graphic matroids and transversal matroids. For all the results presented in this paper, the undirected counterpart also holds.

[1]  Yusuke Kobayashi,et al.  Covering Intersecting Bi-set Families under Matroid Constraints , 2016, SIAM J. Discret. Math..

[2]  C. Nash-Williams Edge-disjoint spanning trees of finite graphs , 1961 .

[3]  W. T. Tutte On the Problem of Decomposing a Graph into n Connected Factors , 1961 .

[4]  László Szegő On covering intersecting set-systems by digraphs , 2001 .

[5]  Atsushi Takizawa,et al.  Arc-disjoint in-trees in directed graphs , 2008, SODA '08.

[6]  András Frank,et al.  On the orientation of graphs , 1980, J. Comb. Theory, Ser. B.

[7]  Zoltán Szigeti,et al.  Matroid-Based Packing of Arborescences , 2013, SIAM J. Discret. Math..

[8]  Zoltán Szigeti,et al.  Packing of arborescences with matroid constraints via matroid intersection , 2019, Mathematical Programming.

[9]  András Frank,et al.  Egerváry Research Group on Combinatorial Optimization on the Orientation of Graphs and Hypergraphs on the Orientation of Graphs and Hypergraphs , 2022 .

[10]  Shin-ichi Tanigawa,et al.  Rooted-Tree Decompositions with Matroid Constraints and the Infinitesimal Rigidity of Frameworks with Boundaries , 2011, SIAM J. Discret. Math..

[11]  Zoltán Szigeti,et al.  Old and new results on packing arborescences in directed hypergraphs , 2018, Discret. Appl. Math..

[12]  András Frank,et al.  Egerváry Research Group on Combinatorial Optimization on Decomposing a Hypergraph into K Connected Sub-hypergraphs on Decomposing a Hypergraph into K Connected Sub-hypergraphs , 2022 .

[13]  Satoru Fujishige A note on disjoint arborescences , 2010, Comb..

[14]  Csaba Király,et al.  On Maximal Independent Arborescence Packing , 2016, SIAM J. Discret. Math..