论文信息 - Bounding Connected Tree-Width

Bounding Connected Tree-Width

Diestel and M\"uller showed that the connected tree-width of a graph $G$, i.e., the minimum width of any tree-decomposition with connected parts, can be bounded in terms of the tree-width of $G$ and the largest length of a geodesic cycle in $G$. We improve their bound to one that is of correct order of magnitude. Finally, we construct a graph whose connected tree-width exceeds the connected order of any of its brambles. This disproves a conjecture by Diestel and M\"uller asserting an analogue of tree-width duality.

Matthias Hamann | Daniel Weißauer

[1] Reinhard Diestel,et al. Connected Tree-Width , 2012, Comb..

[2] Nicolas Nisse,et al. Connected Treewidth and Connected Graph Searching , 2006, LATIN.

[3] Philippe Jégou,et al. Bag-Connected Tree-Width: A New Parameter for Graph Decomposition , 2014, ISAIM.

[4] Robin Thomas,et al. Graph Searching and a Min-Max Theorem for Tree-Width , 1993, J. Comb. Theory, Ser. B.

[5] Philippe Jégou,et al. Tree-Decompositions with Connected Clusters for Solving Constraint Networks , 2014, CP.

[6] Reinhard Diestel,et al. Graph Theory , 1997 .

[7] Agelos Georgakopoulos,et al. Geodetic Topological Cycles in Locally Finite Graphs , 2009, Electron. J. Comb..