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This article is cited in 1 scientific paper (total in 1 paper)
Mathematical problems of nonlinearity
On a Classification of Periodic Maps on the 2-Torus
D. A. Baranov, V. Z. Grines, O. V. Pochinka, E. E. Chilina National Research University Higher School of Economics
ul. Bolshaya Pecherskaya 25/12, Nizhny Novgorod, 603155 Russia
Abstract:
In this paper, following J. Nielsen, we introduce a complete characteristic of orientation-
preserving periodic maps on the two-dimensional torus. All admissible complete characteristics
were found and realized. In particular, each of the classes of orientation-preserving periodic
homeomorphisms on the 2-torus that are nonhomotopic to the identity is realized by an algebraic
automorphism. Moreover, it is shown that the number of such classes is finite. According to
V. Z. Grines and A. Bezdenezhnykh, any gradient-like orientation-preserving diffeomorphism of
an orientable surface is represented as a superposition of the time-1 map of a gradient-like flow
and some periodic homeomorphism. Thus, the results of this work are directly related to the
complete topological classification of gradient-like diffeomorphisms on surfaces.
Keywords:
gradient-like flows and diffeomorphisms on surfaces, periodic homeomorphisms,
torus.
Received: 10.04.2022 Accepted: 10.06.2022
Citation:
D. A. Baranov, V. Z. Grines, O. V. Pochinka, E. E. Chilina, “On a Classification of Periodic Maps on the 2-Torus”, Rus. J. Nonlin. Dyn., 19:1 (2023), 91–110
Linking options:
https://www.mathnet.ru/eng/nd840 https://www.mathnet.ru/eng/nd/v19/i1/p91
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Abstract page: | 88 | Full-text PDF : | 23 | References: | 16 |
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