Search results for "Completely independent spanning tree"

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Completely independent spanning trees in some regular graphs

2014

International audience; Let k >= 2 be an integer and T-1,..., T-k be spanning trees of a graph G. If for any pair of vertices {u, v} of V(G), the paths between u and v in every T-i, 1 <= i <= k, do not contain common edges and common vertices, except the vertices u and v, then T1,... Tk are completely independent spanning trees in G. For 2k-regular graphs which are 2k-connected, such as the Cartesian product of a complete graph of order 2k-1 and a cycle, and some Cartesian products of three cycles (for k = 3), the maximum number of completely independent spanning trees contained in these graphs is determined and it turns out that this maximum is not always k. (C) 2016 Elsevier B.V. All righ…

FOS: Computer and information sciences[ MATH ] Mathematics [math]Discrete Mathematics (cs.DM)Small Depths0102 computer and information sciences02 engineering and technology[INFO.INFO-DM]Computer Science [cs]/Discrete Mathematics [cs.DM]01 natural sciencesCombinatoricssymbols.namesakeCompletely independent spanning treeFOS: Mathematics0202 electrical engineering electronic engineering information engineeringCartesian productDiscrete Mathematics and CombinatoricsMathematics - Combinatorics[MATH]Mathematics [math]MathematicsConstructionSpanning treeSpanning treeApplied MathematicsComplete graph020206 networking & telecommunications[ INFO.INFO-DM ] Computer Science [cs]/Discrete Mathematics [cs.DM]Cartesian productIndependent spanning treesGraphPlanar graphPlanar Graphs010201 computation theory & mathematicssymbolsCompletely independent spanning tree.Combinatorics (math.CO)Computer Science - Discrete Mathematics

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Almost disjoint spanning trees: relaxing the conditions for completely independent spanning trees

2017

International audience; The search of spanning trees with interesting disjunction properties has led to the introduction of edge-disjoint spanning trees, independent spanning trees and more recently completely independent spanning trees. We group together these notions by dening (i, j)-disjoint spanning trees, where i (j, respectively) is the number of vertices (edges, respectively) that are shared by more than one tree. We illustrate how (i, j)-disjoint spanning trees provide some nuances between the existence of disjoint connected dominating sets and completely independent spanning trees. We prove that determining if there exist two (i, j)-disjoint spanning trees in a graph G is NP-comple…

FOS: Computer and information sciences[INFO.INFO-CC]Computer Science [cs]/Computational Complexity [cs.CC]Discrete Mathematics (cs.DM)Spanning trees[ INFO.INFO-NI ] Computer Science [cs]/Networking and Internet Architecture [cs.NI]0102 computer and information sciences02 engineering and technologyMinimum spanning tree[INFO.INFO-DM]Computer Science [cs]/Discrete Mathematics [cs.DM]01 natural sciencesConnected dominating setCombinatorics[INFO.INFO-NI]Computer Science [cs]/Networking and Internet Architecture [cs.NI]0202 electrical engineering electronic engineering information engineeringDiscrete Mathematics and CombinatoricsGridMathematicsMinimum degree spanning treeDiscrete mathematics020203 distributed computingTrémaux treeSpanning treeApplied MathematicsShortest-path treeWeight-balanced tree[ INFO.INFO-DM ] Computer Science [cs]/Discrete Mathematics [cs.DM]Disjoint connected dominating setsIndependent spanning trees[ INFO.INFO-CC ] Computer Science [cs]/Computational Complexity [cs.CC]010201 computation theory & mathematicsReverse-delete algorithmCompletely independent spanning treesComputer Science - Discrete MathematicsMathematicsofComputing_DISCRETEMATHEMATICS

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