This article is cited in 4 papers

Closed locally minimal nets on tetrahedra

N. P. Strelkova

M. V. Lomonosov Moscow State University, Faculty of Mechanics and Mathematics

Abstract: Closed locally minimal networks are in a sense a generalization of closed geodesics. A complete classification is known of closed locally minimal networks on regular (and generally any equihedral) tetrahedra. In the present paper certain necessary and certain sufficient conditions are given for at least one closed locally minimal network to exist on a given non-equihedral tetrahedron.
Bibliography: 6 titles.

Keywords: minimal network, non-equihedral tetrahedron.

UDC: 514.113.5+514.774.8

MSC: Primary 52B05; Secondary 05C35, 51M16

Received: 07.12.2009

DOI: 10.4213/sm7662

 English version: Sbornik: Mathematics, 2011, 202:1, 135–153

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