Colorful Priority k-Supplier

Abstract

In the Priority k-Supplier problem the input consists of a metric space (F C, d) over set of facilities F and a set of clients C, an integer k > 0, and a non-negative radius rv for each client v ∈ C. The goal is to select k facilities S ⊂eq F to minimize v ∈ C d(v,S)rv where d(v,S) is the distance of v to the closes facility in S. This problem generalizes the well-studied k-Center and k-Supplier problems, and admits a 3-approximation [Plesn\'ik, 1987, Bajpai et al., 2022. In this paper we consider two outlier versions. The Priority k-Supplier with Outliers problem [Bajpai et al., 2022] allows a specified number of outliers to be uncovered, and the Priority Colorful k-Supplier problem is a further generalization where clients are partitioned into c colors and each color class allows a specified number of outliers. These problems are partly motivated by recent interest in fairness in clustering and other optimization problems involving algorithmic decision making. We build upon the work of [Bajpai et al., 2022] and improve their 9-approximation Priority k-Supplier with Outliers problem to a 1+33≈ 6.196-approximation. For the Priority Colorful k-Supplier problem, we present the first set of approximation algorithms. For the general case with c colors, we achieve a 17-pseudo-approximation using k+2c-1 centers. For the setting of c=2, we obtain a 7-approximation in random polynomial time, and a 2+5≈ 4.236-pseudo-approximation using k+1 centers.