A QPTAS for Facility Location on Unit Disk graphs

TL;DR

This paper introduces the first Quasi-Polynomial Time Approximation Scheme for the uncapacitated facility location problem on unit disk graphs, a dense geometric graph class, filling a significant gap in approximation algorithms for such dense structures.

Contribution

It provides the first QPTAS for facility location on UDGs, extending approximation techniques from sparse to dense geometric graphs.

Findings

First QPTAS for facility location on UDGs

Bridges the gap between sparse and dense geometric graph approximation

Establishes new techniques for dense geometric graph problems

Abstract

We study the classic \textsc{(Uncapacitated) Facility Location} problem on Unit Disk Graphs (UDGs). For a given point set $P$ in the plane, the unit disk graph UDG(P) on $P$ has vertex set $P$ and an edge between two distinct points $p, q \in P$ if and only if their Euclidean distance $|pq|$ is at most 1. The weight of the edge $pq$ is equal to their distance $|pq|$. An instance of \fl on UDG(P) consists of a set $C\subseteq P$ of clients and a set $F\subseteq P$ of facilities, each having an opening cost $f_i$. The goal is to pick a subset $F'\subseteq F$ to open while minimizing $\sum_{i\in F'} f_i + \sum_{v\in C} d(v,F')$, where $d(v,F')$ is the distance of $v$ to nearest facility in $F'$ through UDG(P). In this paper, we present the first Quasi-Polynomial Time Approximation Schemes (QPTAS) for the problem. While approximation schemes are well-established for facility location problems on sparse geometric graphs (such as planar graphs), there is a lack of such results for dense graphs. Specifically, prior to this study, to the best of our knowledge, there was no approximation scheme for any facility location problem on UDGs in the general setting.