A PTAS for Three-Edge Connectivity in Planar Graphs

Abstract

We consider the problem of finding the minimum-weight subgraph that satisfies given connectivity requirements. Specifically, given a requirement r ∈ \0,1,2,3\ for every vertex, we seek the minimum-weight subgraph that contains, for every pair of vertices u and v, at least \ r(v), r(u)\ edge-disjoint u-to-v paths. We give a polynomial-time approximation scheme (PTAS) for this problem when the input graph is planar and the subgraph may use multiple copies of any given edge. This generalizes an earlier result for r ∈ \0,1,2\. In order to achieve this PTAS, we prove some properties of triconnected planar graphs that may be of independent interest.