Exact solution algorithms for the maximum flow problem with additional conflict constraints
Title | Exact solution algorithms for the maximum flow problem with additional conflict constraints |
Publication Type | Journal Article |
Year of Publication | 2020 |
Authors | Şuvak, Z., K. I. Altinel, and N. Aras |
Journal | European Journal of Operational Research |
Volume | 287 |
Pagination | 410-437 |
ISSN | 0377-2217 |
Keywords | Benders decomposition, Branch-and-bound, Combinatorial optimization, Conflict, Maximum flow, Russian doll search |
Abstract | We consider a variant of the maximum flow problem on a given directed graph where some arc pairs are incompatible or conflicting; in other words, they are not allowed to carry positive flow simultaneously. This problem, called the maximum flow problem with conflicts, is known to be strongly NP-hard. In this paper, we present mixed-integer linear programming formulations for the problem and develop exact solution methods based on Benders decomposition, branch-and-bound, and Russian Doll Search over the conflict graph which represents the conflict relations. The effectiveness of the proposed algorithms is tested on a large number of randomly generated instances. The results reveal that their performances are superior to solving the mixed-integer linear programming formulations with a commercial software. |
URL | https://www.sciencedirect.com/science/article/pii/S0377221720303192 |
DOI | 10.1016/j.ejor.2020.04.001 |