Unit Disk Cover Problem

Abstract

Given a set D of unit disks in the Euclidean plane, we consider (i) the discrete unit disk cover (DUDC) problem and (ii) the rectangular region cover (RRC) problem. In the DUDC problem, for a given set P of points the objective is to select minimum cardinality subset D* ⊂eq D such that each point in P is covered by at least one disk in D*. On the other hand, in the RRC problem the objective is to select minimum cardinality subset D** ⊂eq D such that each point of a given rectangular region R is covered by a disk in D**. For the DUDC problem, we propose an (9+ε)-factor (0 < ε ≤ 6) approximation algorithm. The previous best known approximation factor was 15 FL12. For the RRC problem, we propose (i) an (9 + ε)-factor (0 < ε ≤ 6) approximation algorithm, (ii) an 2.25-factor approximation algorithm in reduce radius setup, improving previous 4-factor approximation result in the same setup FKKLS07. The solution of DUDC problem is based on a PTAS for the subproblem LSDUDC, where all the points in P are on one side of a line and covered by the disks centered on the other side of that line.