Go to JCSE homepageCovering Points in the Plane by Two Rectangular Annuli
Abstract: Given a set P of n points in the plane, we study the problem of covering P by an optimal pair of two disjoint rectangular
annuli. The optimality is determined by a prescribed cost function that depends on the widths of the resulting rectangular
annuli, such as the maximum or the sum of the widths of the two annuli. In this paper, we present the first O(n log n)-
time algorithms for a wide range of cost functions, including the min-max and min-sum versions of the problem. We also
show the matching lower bound of Ω(n log n), in particular, for the min-sum problem.
Submission Length: Regular submission (submissions may be any length)
Assigned Action Editor: samhnoh@vt.edu
Submission Number: 1
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