Benders decomposition for Network Design Covering Problems
Abstract
We consider two covering variants of the network design problem. We are given a set of origin/destination pairs, called O/D pairs, and each such O/D pair is covered if there exists a path in the network from the origin to the destination whose length is not larger than a given threshold. In the first problem, called the Maximal Covering Network Design problem, one must determine a network that maximizes the total fulfilled demand of the covered O/D pairs subject to a budget constraint on the design costs of the network. In the second problem, called the Partial Covering Network Design problem, the design cost is minimized while a lower bound is set on the total demand covered. After presenting formulations, we develop a Benders decomposition approach to solve the problems. Further, we consider several stabilization methods to determine Benders cuts as well as the addition of cut-set inequalities to the master problem. We also consider the impact of adding an initial solution to our methods. Computational experiments show the efficiency of these different aspects.
Cite
@article{arxiv.2007.06647,
title = {Benders decomposition for Network Design Covering Problems},
author = {Víctor Bucarey and Bernard Fortz and Natividad González-Blanco and Martine Labbé and Juan A. Mesa},
journal= {arXiv preprint arXiv:2007.06647},
year = {2021}
}