Paths and Intersections: Exact Emulators for Planar Graphs

Abstract

We study vertex sparsification for preserving distances in planar graphs. Given an edge-weighted planar graph with k terminals, the goal is to construct an emulator, which is a smaller edge-weighted planar graph that contains the terminals and exactly preserves the pairwise distances between them. We construct exact planar emulators of size O(f2k2) in the setting where terminals lie on f faces in the planar embedding of the input graph. Our result generalizes and interpolates between the previous results of Chang and Ophelders and Goranci, Henzinger, and Peng which is an O(k2) bound in the setting where all terminals lie on a single face (i.e., f=1), and the result of Krauthgamer, Nguyen, and Zondiner, which is an O(k4) bound for the general case (i.e., f=k). Our construction follows a recent new way of analyzing graph structures, by viewing graphs as paths and their intersections, which we believe is of independent interest.