Correlation Clustering with Vertex Splitting
Abstract
We explore Cluster Editing and its generalization Correlation Clustering with a new operation called permissive vertex splitting which addresses finding overlapping clusters in the face of uncertain information. We determine that both problems are NP-hard, yet they exhibit significant differences in parameterized complexity and approximability. For Cluster Editing with Permissive Vertex Splitting, we show a polynomial kernel when parameterized by the solution size and develop a polynomial-time algorithm with approximation factor 7. In the case of Correlation Clustering, we establish para-NP-hardness when parameterized by solution size and demonstrate that computing an -approximation is NP-hard for any constant . Additionally, we extend the established link between Correlation Clustering and Multicut to the setting with permissive vertex splitting.
Cite
@article{arxiv.2402.10335,
title = {Correlation Clustering with Vertex Splitting},
author = {Matthias Bentert and Alex Crane and Pål Grønås Drange and Felix Reidl and Blair D. Sullivan},
journal= {arXiv preprint arXiv:2402.10335},
year = {2024}
}
Comments
Version 2 includes minor changes incorporating reviewer feedback. Short version appeared at SWAT 2024