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2008 Steiner ratios for length spaces having ends
Nobuhiro Innami, Shinetsu Tamura
Nihonkai Math. J. 19(2): 105-110 (2008).

Abstract

We prove that the Steiner ratios for complete locally compact length spaces having $n$ ends are less than or equal to $n/2(n-1)$. In particular, the Steiner ratio of a complete simply connected surface with a pole satisfying the Visibility axiom is $1/2$.

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Nobuhiro Innami. Shinetsu Tamura. "Steiner ratios for length spaces having ends." Nihonkai Math. J. 19 (2) 105 - 110, 2008.

Information

Published: 2008
First available in Project Euclid: 18 March 2013

zbMATH: 1173.53314
MathSciNet: MR2490132

Subjects:
Primary: 53C20
Secondary: 05C05

Keywords: Differential geometry , geometry of geodesics , Steiner ratio , Steiner tree

Rights: Copyright © 2008 Niigata University, Department of Mathematics

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Vol.19 • No. 2 • 2008
Niigata University, Department of Mathematics
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