An Efficient Algorithm for the Partitioning Min-Max Weighted Matching Problem

Abstract

The Partitioning Min-Max Weighted Matching (PMMWM) problem is an NP-hard problem that combines the problem of partitioning a group of vertices of a bipartite graph into disjoint subsets with limited size and the classical Min-Max Weighted Matching (MMWM) problem. Kress et al. proposed this problem in 2015 and they also provided several algorithms, among which MPLS is the state-of-the-art. In this work, we observe there is a time bottleneck in the matching phase of MPLS. Hence, we optimize the redundant operations during the matching iterations, and propose an efficient algorithm called the MPKM-M that greatly speeds up MPLS. The bottleneck time complexity is optimized from O(n3) to O(n2). We also prove the correctness of MPKM-M by the primal-dual method. To test the performance on diverse instances, we generate various types and sizes of benchmarks, and carried out an extensive computational study on the performance of MPKM-M and MPLS. The evaluation results show that our MPKM-M greatly shortens the runtime as compared with MPLS while yielding the same solution quality.