Metric Approximations of Consistent Path Systems

Abstract

A path system P in a graph G=(V,E) is a collection of paths, with exactly one path between any two vertices in V. A path system is said to be consistent if it is closed under subpaths. We say that a path system P is α-metric if there exists a metric ρ on V such that Σi=1kρ(xi-1,xi) αρ(x0,xk) for every path (x0,x1,…,xk)∈ P. Also, we denote by Δ(P) the infimum of α for which P is α-metric. We show that Δ(P) O(n) for every n-point consistent path system P. On the other hand, we construct infinitely many n-point consistent path systems Pn with Δ(Pn) Ω(n), showing these bounds are tight up to a polylogarithmic factor. We also show how to efficiently compute Δ(P) for a given path system.