In this paper we prove that random $d$--regular graphs with $d\geq 3$ have
traffic congestion of the order $O(n\log_{d-1}^{3}(n))$ where $n$ is the number
of nodes and geodesic routing is used. We also show that these graphs are not
asymptotically $\delta$--hyperbolic for any non--negative $\delta$ almost
surely as $n\to\infty$.Comment: 6 pages, 2 figure

Tucci, Gabriel H.

English

arXiv

Abstract. In this paper we prove that random d–regular graphs with d ≥ 3 have traffic congestion of the order O(n log3d−1(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→∞. 1

Random Regular Graphs are not Asymptotically Gromov Hyperbolic

Abstract

Similar works

Full text

Available Versions

CiteSeerX