Gabow's Cardinality Matching Algorithm in General Graphs: Implementation and Experiments
Abstract
It is known since 1975 (\cite{HK75}) that maximum cardinality matchings in bipartite graphs with nodes and edges can be computed in time . Asymptotically faster algorithms were found in the last decade and maximum cardinality bipartite matchings can now be computed in near-linear time~\cite{NearlyLinearTimeBipartiteMatching, AlmostLinearTimeMaxFlow,AlmostLinearTimeMinCostFlow}. For general graphs, the problem seems harder. Algorithms with running time were given in~\cite{MV80,Vazirani94,Vazirani12,Vazirani20,Vazirani23,Goldberg-Karzanov,GT91,Gabow:GeneralMatching}. Mattingly and Ritchey~\cite{Mattingly-Ritchey} and Huang and Stein~\cite{Huang-Stein} discuss implementations of the Micali-Vazirani Algorithm. We describe an implementation of Gabow's algorithm~\cite{Gabow:GeneralMatching} in C++ based on LEDA~\cite{LEDAsystem,LEDAbook} and report on running time experiments. On worst-case graphs, the asymptotic improvement pays off dramatically. On random graphs, there is no improvement with respect to algorithms that have a worst-case running time of . The performance seems to be near-linear. The implementation is available open-source.
Cite
@article{arxiv.2409.14849,
title = {Gabow's Cardinality Matching Algorithm in General Graphs: Implementation and Experiments},
author = {Matin Ansaripour and Alireza Danaei and Kurt Mehlhorn},
journal= {arXiv preprint arXiv:2409.14849},
year = {2024}
}