Multipacking in Euclidean Metric Space
Abstract
Here we study the multipacking problems for geometric point sets with respect to their Euclidean distances. We consider a set of n points P and define Ns[v] as the subset of P that includes the s nearest points of v ∈ P and the point v itself. We assume that the s-th neighbor of each point is unique, for every s ∈ \0, 1, 2, … , n-1\. For a natural number r ≤ n-1, an r-multipacking is a set M ⊂eq P such that for each point v ∈ P and for every integer 1≤ s ≤ r , |Ns[v] M|≤ (s+1)/2. The r-multipacking number of P is the maximum cardinality of an r-multipacking of P and is denoted by r(P) . For r=n-1, an r-multipacking is called a multipacking and r-multipacking number is called as multipacking number. For r=1 and 2, we study the problem of computing a maximum r-multipacking of the point sets in R2. We show that a maximum 1-multipacking can be computed in polynomial time but computing a maximum 2-multipacking is NP-hard. Further, we provide approximation and parameterized solutions to the 2-multipacking problem.
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