Spanning trees of bounded degree in random geometric graphs
Abstract
We determine the sharp threshold for the containment of all n-vertex trees of bounded degree in random geometric graphs with n vertices. This provides a geometric counterpart of Montgomery's threshold result for binomial random graphs, and confirms a conjecture of Espuny D\'iaz, Lichev, Mitsche, and Wesolek. Our proof is algorithmic and adapts to other families of graphs, in particular graphs with bounded genus or tree-width.
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