Nimrod Megiddo scite author profile

Abstract. Given n demand points in the plane, the p-center problem is to find p supply points (anywhere in the plane) so as to minimize the maximum distance from a demo& point to its respective nearest supply point. The p-median problem is to minimize the sum of distances from demand points to their respective nearest supply points. We prove that the p-center and the p-media problems relative to both the Euclidean and the rectilinear metrics are NP-hard. In fact, we prove that it is NP-hard even to approximate the p-center problems sufficiently closely. The reductions are from 3-satisfiability.

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A Unified Approach to Interior Point Algorithms for Linear Complementarity Problems

Kojima¹,

Megiddo²,

Noma³

et al. 1991

415

281

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Linear Programming in Linear Time When the Dimension Is Fixed

Megiddo

1984

J. ACM

568

280

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Nimrod Megiddo

A logic for reasoning about probabilities

Linear-Time Algorithms for Linear Programming in $R^3 $ and Related Problems

On the Complexity of Some Common Geometric Location Problems

A Unified Approach to Interior Point Algorithms for Linear Complementarity Problems

Linear Programming in Linear Time When the Dimension Is Fixed

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