A Broader View on Clustering under Cluster-Aware Norm Objectives

Abstract

We revisit the (f,g)-clustering problem that we introduced in a recent work [SODA'25], and which subsumes fundamental clustering problems such as k-Center, k-Median, Min-Sum of Radii, and Min-Load k-Clustering. This problem assigns each of the k clusters a cost determined by the monotone, symmetric norm f applied to the vector distances in the cluster, and aims at minimizing the norm g applied to the vector of cluster costs. Previously, we focused on certain special cases for which we designed constant-factor approximation algorithms. Our bounds for more general settings left, however, large gaps to the known bounds for the basic problems they capture. In this work, we provide a clearer picture of the approximability of these more general settings. First, we design an O(2 n)-approximation algorithm for (f, L1)-clustering for any f. This improves upon our previous O(n)-approximation. Second, we provide an O(k)-approximation for the general (f,g)-clustering problem, which improves upon our previous O(kn)-approximation algorithm and matches the best-known upper bound for Min-Load k-Clustering. We then design an approximation algorithm for (f,g)-clustering that interpolates, up to polylog factors, between the best known bounds for k-Center, k-Median, Min-Sum of Radii, Min-Load k-Clustering, (Top, L1)-clustering, and (L∞,g)-clustering based on a newly defined parameter of f and g.

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