The Non-Uniform k-Center Problem

43rd International Colloquium on Automata, Languages, and Programming, ICALP 2016, Rome, Italy |

Published by Schloss Dagstuhl--Leibniz-Zentrum fuer Informatik

Publication

In this paper, we introduce and study the Non-Uniform k-Center problem (NUkC). Given a finite metric space (X,d) and a collection of balls of radii {r1rk}, the NUkC problem is to find a placement of their centers on the metric space and find the minimum dilation α, such that the union of balls of radius αri around the ith center covers all the points in X. This problem naturally arises as a min-max vehicle routing problem with fleets of different speeds.
The NUkC problem generalizes the classic k-center problem when all the k radii are the same (which can be assumed to be 1 after scaling). It also generalizes the k-center with outliers (kCwO) problem when there are k balls of radius 1 and balls of radius 0. There are 2-approximation and 3-approximation algorithms known for these problems respectively; the former is best possible unless P=NP and the latter remains unimproved for 15 years.
We first observe that no O(1)-approximation is to the optimal dilation is possible unless P=NP, implying that the NUkC problem is more non-trivial than the above two problems. Our main algorithmic result is an (O(1),O(1))-bi-criteria approximation result: we give an O(1)-approximation to the optimal dilation, however, we may open Θ(1) centers of each radii. Our techniques also allow us to prove a simple (uni-criteria), optimal 2-approximation to the kCwO problem improving upon the long-standing 3-factor. Our main technical contribution is a connection between the NUkC problem and the so-called firefighter problems on trees which have been studied recently in the TCS community.