Min-Cost Flow Duality in Planar Networks

Abstract

In this paper we study the min-cost flow problem in planar networks. We start with the min-cost flow problem and apply two transformations, one is based on geometric duality of planar graphs and the other on linear programming duality. The result is a min-cost flow problem in a related planar network whose balance constraints are defined by the costs of the original problem and whose costs are defined by the capacities of the original problem. We use this transformation to show an O(n log2 n) time algorithm for the min-cost flow problem in an n-vertex outerplanar network.