On some geometric selection and optimization problems via sorted matrices

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Abstract

In this paper we apply the selection and optimization technique of Frederickson and Johnson to a number of geometric selection and optimization problems, some of which have previously been solved by parametric search, and provide efficient and simple algorithms. Our technique improves the solutions obtained by parametric search by a log n factor. For example, we apply the technique to the two-line center problem, where we want to find two strips that cover a given set S of n points in the plane, so as to minimize the width of the largest of the two strips.

Keywords

Computational geometry
Algorithm
Selection
Optimization
Two-line center

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A version of this paper appeared in Fourth Workshop on Algorithms and Data Structures, S.G. Akl, F. Dehne, J. Sack and N. Santoro (Eds.), Lecture Notes in Computer Science 955, Springer-Verlag, pp. 26–35.

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Work by K. Kedem has been supported by a grant from the U.S.-Israeli Binational Science Foundation, and by a grant from the Israel Science Foundation founded by The Israel Academy of Sciences and Humanities.