Dimension-Free Parameterized Approximation Schemes for Hybrid Clustering
Abstract
Hybrid -Clustering is a model of clustering that generalizes two of the most widely studied clustering objectives: -Center and -Median. In this model, given a set of points , the goal is to find centers such that the sum of the -distances of each point to its nearest center is minimized. The -distance between two points and is defined as -- this represents the distance of to the boundary of the -radius ball around if is outside the ball, and otherwise. This problem was recently introduced by Fomin et al. [APPROX 2024], who designed a -bicrtieria approximation that runs in time for inputs in ; such a bicriteria solution uses balls of radius instead of , and has a cost at most times the cost of an optimal solution using balls of radius . In this paper we significantly improve upon this result by designing an approximation algorithm with the same bicriteria guarantee, but with running time that is FPT only in and -- crucially, removing the exponential dependence on the dimension . This resolves an open question posed in their paper. Our results extend further in several directions. First, our approximation scheme works in a broader class of metric spaces, including doubling spaces, minor-free, and bounded treewidth metrics. Secondly, our techniques yield a similar bicriteria FPT-approximation schemes for other variants of Hybrid -Clustering, e.g., when the objective features the sum of -th power of the -distances. Finally, we also design a coreset for Hybrid -Clustering in doubling spaces, answering another open question from the work of Fomin et al.
Cite
@article{arxiv.2501.03663,
title = {Dimension-Free Parameterized Approximation Schemes for Hybrid Clustering},
author = {Ameet Gadekar and Tanmay Inamdar},
journal= {arXiv preprint arXiv:2501.03663},
year = {2025}
}
Comments
To appear in STACS 2025