Traffic Congestion in Expanders, (p,δ)--Hyperbolic Spaces and Product of Trees

Abstract

In this paper we define the notion of (p,δ)--Gromov hyperbolic space where we relax Gromov's slimness condition to allow that not all but a positive fraction of all triangles are δ--slim. Furthermore, we study maximum vertex congestion under geodesic routing and show that it scales as (p2n2/Dn2) where Dn is the diameter of the graph. We also construct a constant degree family of expanders with congestion (n2) in contrast with random regular graphs that have congestion O(n3(n)). Finally, we study traffic congestion on graphs defined as product of trees.