We introduce a lower bounding technique for the min max correlation clustering problem and, based on this technique, a combinatorial 4-approximation algorithm for complete graphs. This improves upon the previous best known approximation guarantees of 5, using a linear program formulation (Kalhan et al., 2019), and 40, for a combinatorial algorithm (Davies et al., 2023a). We extend this algorithm by a greedy joining heuristic and show empirically that it improves the state of the art in solution quality and runtime on several benchmark datasets.
%0 Journal Article
%1 Heidrich2023-jd
%A Heidrich, Holger
%A Irmai, Jannik
%A Andres, Bjoern
%D 2023
%I arXiv
%K topic_visualcomputing
%T A 4-approximation algorithm for min max correlation clustering
%X We introduce a lower bounding technique for the min max correlation clustering problem and, based on this technique, a combinatorial 4-approximation algorithm for complete graphs. This improves upon the previous best known approximation guarantees of 5, using a linear program formulation (Kalhan et al., 2019), and 40, for a combinatorial algorithm (Davies et al., 2023a). We extend this algorithm by a greedy joining heuristic and show empirically that it improves the state of the art in solution quality and runtime on several benchmark datasets.
@article{Heidrich2023-jd,
abstract = {We introduce a lower bounding technique for the min max correlation clustering problem and, based on this technique, a combinatorial 4-approximation algorithm for complete graphs. This improves upon the previous best known approximation guarantees of 5, using a linear program formulation (Kalhan et al., 2019), and 40, for a combinatorial algorithm (Davies et al., 2023a). We extend this algorithm by a greedy joining heuristic and show empirically that it improves the state of the art in solution quality and runtime on several benchmark datasets.},
added-at = {2024-09-10T10:41:24.000+0200},
author = {Heidrich, Holger and Irmai, Jannik and Andres, Bjoern},
biburl = {https://puma.scadsai.uni-leipzig.de/bibtex/257246ed46d619e6cfa9be6823c8ef028/scadsfct},
interhash = {c5fbf9ab525cab2f2d62b3a7852e174c},
intrahash = {57246ed46d619e6cfa9be6823c8ef028},
keywords = {topic_visualcomputing},
publisher = {arXiv},
timestamp = {2024-11-22T15:50:12.000+0100},
title = {A 4-approximation algorithm for min max correlation clustering},
year = 2023
}