Near-Linear -Emulators for Planar Graphs

Abstract

We study vertex sparsification for distances, in the setting of planar graphs with distortion: Given a planar graph G (with edge weights) and a subset of k terminal vertices, the goal is to construct an -emulator, which is a small planar graph G' that contains the terminals and preserves the distances between the terminals up to factor 1+. We construct the first -emulators for planar graphs of near-linear size O(k/O(1)). In terms of k, this is a dramatic improvement over the previous quadratic upper bound of Cheung, Goranci and Henzinger, and breaks below known quadratic lower bounds for exact emulators (the case when =0). Moreover, our emulators can be computed in (near-)linear time, which lead to fast (1+)-approximation algorithms for basic optimization problems on planar graphs, including multiple-source shortest paths, minimum (s,t)-cut, graph diameter, and dynamic distace oracle.