Asymmetric distances, semidirected networks and majority in Fermat–Weber problems

Plastria, Frank

doi:10.1007/s10479-008-0351-0

Cited by 38 publications

(22 citation statements)

References 37 publications

(42 reference statements)

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“…Theorem 6 settles the question for norm distances d. In order to prove it, we need a generalized version of the Cauchy-Schwarz inequality which can be found for example in [14,22,23].…”

Section: Theorem 2 (Pseudo-halving Property) Let L Be Optimal For (M mentioning

confidence: 96%

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Locating a median line with partial coverage distance

2014

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We generalize the classical median line location problem, where the sum of distances from a line to some given demand points is to be minimized, to a setting with partial coverage distance. In this setting, a demand point within a certain specified threshold distance r of the line is considered covered and its partial coverage distance is considered to be zero, while non-covered demand points are penalized an amount proportional to their distance to the coverage region. The sum of partial coverage distances is to be minimized. We consider general norm distances as well as the vertical distance and extend classical properties of the median line location problem to the partial coverage case. We are finally able to derive a finite dominating set. While a simple enumeration of the finite dominating set takes O(m 3 ) time, m being the number of demand points, we show that this can be reduced to O(m 2 log m) in the general case by plane sweeping techniques and even to O(m) for the vertical distance and block norm distances by linear programming.

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“…Theorem 6 settles the question for norm distances d. In order to prove it, we need a generalized version of the Cauchy-Schwarz inequality which can be found for example in [14,22,23].…”

Section: Theorem 2 (Pseudo-halving Property) Let L Be Optimal For (M mentioning

confidence: 96%

“…Observe that the first constraint is equivalent to two linear constraints, since we have by the generalized Cauchy-Schwarz inequality (see again [14,22,23])…”

Section: This Determines a Finite Candidate Set For (M L Pc)mentioning

confidence: 99%

Locating a median line with partial coverage distance

2014

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“…For a relation given by the action of a group G on a space X, the local equivalence classes are called local orbits in Hjorth [5], and the notation (14). Similarly, for a uniform relation induced by a generalized pseudo-metric d on a set X, the notation (15).…”

Section: Turbulent Uniform Relationsmentioning

confidence: 99%

On turbulent relations

López

Candel

2018

Fund. Math.

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“…In spite of the pioneering work of [33], the asymmetric distance has started to attract the researchers' interest until the recent several decades, and some progress has been made in both its theoretical and computational aspects recently, see e.g. [2,3,7,15,22,24].…”

mentioning

confidence: 99%

“…For more details about the gauge and dual gauge, as well as their properties, the readers can be referred to [24]. According to (10), CMFWP (7) is equivalent to the following min-max problem:…”

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confidence: 99%

A variational inequality approach for constrained multifacility Weber problem under gauge

Jiang¹,

Zhang²,

Zhang³

et al. 2018

Journal of Industrial &Amp; Management Optimization

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The classical multifacility Weber problem (MFWP) is one of the most important models in facility location. This paper considers more general and practical case of MFWP called constrained multifacility Weber problem (CMFWP), in which the gauge is used to measure distances and locational constraints are imposed to facilities. In particular, we develop a variational inequality approach for solving it. The CMFWP is reformulated into a linear variational inequality, whose special structures lead to new projection-type methods. Global convergence of the projection-type methods is proved under mild assumptions. Some preliminary numerical results are reported which verify the effectiveness of proposed methods.

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Asymmetric distances, semidirected networks and majority in Fermat–Weber problems

Cited by 38 publications

References 37 publications

Locating a median line with partial coverage distance

Locating a median line with partial coverage distance

On turbulent relations

A variational inequality approach for constrained multifacility Weber problem under gauge

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