Branched coverings and Steiner ratio

Branched coverings and Steiner ratio

For a branched locally isometric covering of metric spaces with intrinsic metrics, it is proved that the Steiner ratio of the base is not less than the Steiner ratio of the total space of the covering. As applications, it is shown that the Steiner ratio of the surface of an isosceles tetrahedron is...

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Veröffentlicht in:International transactions in operational research 2016-09, Vol.23 (5), p.875-882
Hauptverfasser: Ivanov, A. O., Tuzhilin, A. A.
Format: Artikel
Sprache:eng
Schlagworte:
branched covering
Coverings
Euclidean geometry
Euclidean space
flat cone
Flats
isosceles tetrahedron
locally isometric covering
Metric space
Operational research
Operations research
Planes
Steiner ratio
Studies
Tetrahedrons
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Beschreibung
Zusammenfassung:For a branched locally isometric covering of metric spaces with intrinsic metrics, it is proved that the Steiner ratio of the base is not less than the Steiner ratio of the total space of the covering. As applications, it is shown that the Steiner ratio of the surface of an isosceles tetrahedron is equal to the Steiner ratio of the Euclidean plane, and that the Steiner ratio of a flat cone with angle of 2π/k at its vertex is also equal to the Steiner ratio of the Euclidean plane.
ISSN:0969-6016
1475-3995
DOI:10.1111/itor.12182