Locating a minisum circle in the plane

2009 | Zeitschriftenartikel. Eine Publikation mit Affiliation zur Georg-August-Universität Göttingen.

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​Brimberg, J., Juel, H. & Schoebel, A. (2009). ​Locating a minisum circle in the plane. Discrete Applied Mathematics157(5), ​901​-912​. ​doi: https://doi.org/10.1016/j.dam.2008.03.017 

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Autor(en)
Brimberg, Jack; Juel, Henrik; Schoebel, Anita
Zusammenfassung
We consider the problem of locating a circle with respect to existing facilities in the plane such that the sum of weighted distances between the circle and the facilities is minimized, i.e., we approximate a set of given points by a circle regarding the sum of weighted distances. If the radius of the circle is a variable we show that there always exists an optimal circle passing through two of the existing facilities. For the case of a fixed radius we provide characterizations of optimal circles in special cases. Solution procedures are suggested. (C) 2008 Elsevier B.V. All rights reserved.
Erscheinungsdatum
2009
Status
published
Herausgeber
Elsevier Science Bv
Zeitschrift
Discrete Applied Mathematics 
ISSN
1872-6771; 0166-218X

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