Random Regular Graphs are not Asymptotically Gromov Hyperbolic
Abstract
In this paper we prove that random d--regular graphs with d≥ 3 have traffic congestion of the order O(nd-13(n)) where n is the number of nodes and geodesic routing is used. We also show that these graphs are not asymptotically δ--hyperbolic for any non--negative δ almost surely as n∞.
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