Distance-Uniform Graphs with Large Diameter

Abstract

An ε-distance-uniform graph is one in which from every vertex, all but an ε-fraction of the remaining vertices are at some fixed distance d, called the critical distance. We consider the maximum possible value of d in an ε-distance-uniform graph with n vertices. We show that for 1n ε 1 n, there exist ε-distance-uniform graphs with critical distance 2( n ε-1), disproving a conjecture of Alon et al. that d can be at most logarithmic in n. We also show that our construction is best possible, in the sense that an upper bound on d of the form 2O( n ε-1) holds for all ε and n.