A Subquadratic Time Approximation Algorithm for Individually Fair k-Center

December 06, 2024 Β· Declared Dead Β· πŸ› International Conference on Artificial Intelligence and Statistics

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Authors Matthijs Ebbens, Nicole Funk, Jan HΓΆckendorff, Christian Sohler, Vera Weil arXiv ID 2412.04943 Category cs.DS: Data Structures & Algorithms Cross-listed cs.CG Citations 1 Venue International Conference on Artificial Intelligence and Statistics Last Checked 4 months ago
Abstract
We study the $k$-center problem in the context of individual fairness. Let $P$ be a set of $n$ points in a metric space and $r_x$ be the distance between $x \in P$ and its $\lceil n/k \rceil$-th nearest neighbor. The problem asks to optimize the $k$-center objective under the constraint that, for every point $x$, there is a center within distance $r_x$. We give bicriteria $(Ξ²,Ξ³)$-approximation algorithms that compute clusterings such that every point $x \in P$ has a center within distance $Ξ²r_x$ and the clustering cost is at most $Ξ³$ times the optimal cost. Our main contributions are a deterministic $O(n^2+ kn \log n)$ time $(2,2)$-approximation algorithm and a randomized $O(nk\log(n/Ξ΄)+k^2/\varepsilon)$ time $(10,2+\varepsilon)$-approximation algorithm, where $Ξ΄$ denotes the failure probability. For the latter, we develop a randomized sampling procedure to compute constant factor approximations for the values $r_x$ for all $x\in P$ in subquadratic time; we believe this procedure to be of independent interest within the context of individual fairness.
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