On the relation between graph distance and Euclidean distance in random geometric graphs

Abstract

Given any two vertices u, v of a random geometric graph, denote by dE(u,v) their Euclidean distance and by dG(u,v) their graph distance. The problem of finding upper bounds on dG(u,v) in terms of dE(u,v) has received a lot of attention in the literature. In this paper, we improve these upper bounds for values of r=omega(sqrt(log n)) (i.e. for r above the connectivity threshold). Our result also improves the best-known estimates on the diameter of random geometric graphs. We also provide a lower bound on dG(u,v) in terms of dE(u,v).