Approximating Fair Clustering with Cascaded Norm Objectives
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We introduce the (p,q)-Fair Clustering problem. In this problem, we are given a set of points P and a collection of different weight functions W. We would like to find a clustering which minimizes the ℓ_q-norm of the vector over W of the ℓ_p-norms of the weighted distances of points in P from the centers. This generalizes various clustering problems, including Socially Fair k-Median and k-Means, and is closely connected to other problems such as Densest k-Subgraph and Min k-Union. We utilize convex programming techniques to approximate the (p,q)-Fair Clustering problem for different values of p and q. When p≥ q, we get an O(k^(p-q)/(2pq)), which nearly matches a k^Ω((p-q)/(pq)) lower bound based on conjectured hardness of Min k-Union and other problems. When q≥ p, we get an approximation which is independent of the size of the input for bounded p,q, and also matches the recent O((log n/(loglog n))^1/p)-approximation for (p, ∞)-Fair Clustering by Makarychev and Vakilian (COLT 2021).
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