Paths and Intersections: Recognizing Outerplanar Metrics

Abstract

We study the following distance realization problem: given a metric D on a set T of terminals, does there exist an (edge-weighted) outerplanar graph G, such that T⊂eq V(G), and for every pair t,t'∈ T, distG(t,t')=D(t,t')? We first prove that there is no ``local characterization'', forming a contrast with trees and Okamura-Seymour instances. Our main result is an efficient algorithm for this problem whose running time is polynomial in |T|. Both our proof and our algorithm utilize a recent new approach of analyzing graph structures, by viewing graphs as paths and their intersections, which we believe is of independent interest.