From Vertex-Telecenters to Subtree-Telecenters

Win, Zaw; Than, Cho Kyi

doi:10.1007/978-3-642-38189-8_7

Zaw Win³ &
Cho Kyi Than³

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Abstract

Let T be a tree and v a vertex in T. It is well-known that the branch-weight of v is defined as the maximum number of vertices in the components of T−v and that a vertex of T with the minimum branch-weight is called a vertex-centroid of T. Mitchell (Discrete Math. 24:277–280, 1978) introduced a type of a central vertex called the telephone center or the vertex-telecenter of a tree and showed that v is a vertex-centroid of T if and only if it is a vertex-telecenter of T. In this paper we introduce the notions of the subtree-centroid and the subtree-telecenter of a tree which are natural extensions of the vertex-centroid and the vertex-telecenter, and generalize two theorems of Mitchell (Discrete Math. 24:277–280, 1978) in the extended framework of subtree-centroids and subtree-telecenters. As a consequence of these generalized results we also obtain an efficient solution method which computes a subtree-telecenter of a tree.

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Acknowledgements

Our deepest gratitude goes to Prof. Dr. Martin Grötschel for his guided optimal traveling research-person tour through the world of combinatorial optimization. We are also very thankful to the referee and editors whose comments and suggestions have improved the readability of the paper.

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Department of Mathematics, University of Yangon, Yangon, 11041, Myanmar
Zaw Win & Cho Kyi Than

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Zaw Win
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Cho Kyi Than
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Correspondence to Zaw Win .

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Dept. of Computer Science, University of Cologne, Pohligstr. 1, Cologne, 50969, Germany
Michael Jünger
Dept. of Computer Science, University of Heidelberg, Im Neuenheimer Feld 326, Heidelberg, 69120, Germany
Gerhard Reinelt

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Win, Z., Than, C.K. (2013). From Vertex-Telecenters to Subtree-Telecenters. In: Jünger, M., Reinelt, G. (eds) Facets of Combinatorial Optimization. Springer, Berlin, Heidelberg. https://doi.org/10.1007/978-3-642-38189-8_7

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DOI: https://doi.org/10.1007/978-3-642-38189-8_7
Publisher Name: Springer, Berlin, Heidelberg
Print ISBN: 978-3-642-38188-1
Online ISBN: 978-3-642-38189-8
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