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Mathematical problems of nonlinearity
Antipodal Points and Diameter of a Sphere
A. V. Podobryaev A. K. Ailamazyan Program Systems Institute of RAS, ul. Petra-I 4a, Veskovo, Pereslavl district, Yaroslavl region, 152021 Russia
Abstract:
We give an example of a Riemannian manifold homeomorphic to a sphere such that its diameter cannot be realized as a distance between antipodal points. We consider a Berger sphere, i.e., a three-dimensional sphere with Riemannian metric that is compressed along the fibers of the Hopf fibration. We give a condition for a Berger sphere to have the desired property. We use our previous results on a cut locus of Berger spheres obtained by the method from geometric control theory.
Keywords:
diameter, $SU_2$, Berger sphere, antipodal points, cut locus, geometric control theory.
Received: 04.11.2018 Revised: 01.12.2018
Citation:
A. V. Podobryaev, “Antipodal Points and Diameter of a Sphere”, Nelin. Dinam., 14:4 (2018), 579–581
Linking options:
https://www.mathnet.ru/eng/nd632 https://www.mathnet.ru/eng/nd/v14/i4/p579
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Abstract page: | 232 | Full-text PDF : | 47 | References: | 35 |
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