Chaya Keller, Micha A. Perles, Eduardo Rivera-Campo, Virginia Urrutia-Galicia
Published 2012-01-23Version 1
In this paper we present a complete characterization of the smallest sets that block all the simple spanning trees (SSTs) in a complete geometric graph. We also show that if a subgraph is a blocker for all SSTs of diameter at most 4, then it must block all simple spanning subgraphs, and in particular, all SSTs. For convex geometric graphs, we obtain an even stronger result: being a blocker for all SSTs of diameter at most 3 is already sufficient for blocking all simple spanning subgraphs.
Comments: 14 pages, 10 figures, to appear in the book "Thirty Essays in Geometric Graph Theory" edited by J. Pach
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Packing 1-Plane Hamiltonian Cycles in Complete Geometric Graphs
On Edge-Partitioning of Complete Geometric Graphs into Plane Trees
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