Capacitated Discrete Unit Disk Cover

Abstract

Consider a capacitated version of the discrete unit disk cover problem as follows: consider a set(Formula presented) of n customers and a set(Formula presented) of m service centers. A service center can provide service to at most(Formula presented) number of customers. Each (Formula presented) has a preassigned set of customers to which it can provide service. The objective of the capacitated covering problem is to provide service to each customer in P by at least one service center in Q. In this paper, we consider the geometric version of the capacitated covering problem, where the set of customers and set of service centers are two point sets in the Euclidean plane. A service center can provide service to a customer if their Euclidean distance is less than or equal to 1. We call this problem as (Formula presented) -covering problem. For the (Formula presented) -covering problem, we propose an (Formula presented) time algorithm to check feasible solution for a given instance. We also prove that the (Formula presented) -covering problem is NP-complete for(Formula presented) and it admits a PTAS.