A Scaling Algorithm for Weighted $f$-Factors in General Graphs
Abstract
We study the maximum weight perfect -factor problem on any general simple graph with positive integral edge weights , and , . When we have a function on vertices, a perfect -factor is a generalized matching so that every vertex is matched to different edges. The previous best algorithms on this problem have running time [Gabow 2018] or [Gabow and Sankowski 2013], where is the maximum edge weight, and . In this paper, we present a scaling algorithm for this problem with running time . Previously this bound is only known for bipartite graphs [Gabow and Tarjan 1989]. The running time of our algorithm is independent of , and consequently it first breaks the barrier for large even for the unweighted -factor problem in general graphs.
Cite
@article{arxiv.2003.07589,
title = {A Scaling Algorithm for Weighted $f$-Factors in General Graphs},
author = {Ran Duan and Haoqing He and Tianyi Zhang},
journal= {arXiv preprint arXiv:2003.07589},
year = {2020}
}
Comments
35 pages