Links and Dynamics › Обзор исследований

Standard

Links and Dynamics. / Bardakov, V. g.; Kozlovskaya, T. a.; Pochinka, O. v.

в: Nelineinaya Dinamika, Том 21, № 1, 01.01.2025, стр. 69-83.

Результаты исследований: Научные публикации в периодических изданиях › статья › Рецензирование

Harvard

Bardakov, VG, Kozlovskaya, TA & Pochinka, OV 2025, 'Links and Dynamics', Nelineinaya Dinamika, Том. 21, № 1, стр. 69-83. https://doi.org/10.20537/nd241004, https://doi.org/10.20537/nd2003

APA

Bardakov, V. G., Kozlovskaya, T. A., & Pochinka, O. V. (2025). Links and Dynamics. Nelineinaya Dinamika, 21(1), 69-83. https://doi.org/10.20537/nd241004, https://doi.org/10.20537/nd2003

Vancouver

Bardakov VG, Kozlovskaya TA, Pochinka OV. Links and Dynamics. Nelineinaya Dinamika. 2025 янв. 1;21(1):69-83. doi: 10.20537/nd241004, 10.20537/nd2003

Author

Bardakov, V. g. ; Kozlovskaya, T. a. ; Pochinka, O. v. / Links and Dynamics. в: Nelineinaya Dinamika. 2025 ; Том 21, № 1. стр. 69-83.

BibTeX

@article{0f9754b3ddcd414fb83714088949047d,

title = "Links and Dynamics",

abstract = " Knots naturally appear in continuous dynamical systems as flow periodic trajectories. However, discrete dynamical systems are also closely connected with the theory of knots and links. For example, for Pixton diffeomorphisms, the equivalence class of the Hopf knot, which is the orbit space of the unstable saddle separatrix in the manifold S2 × S1, is a complete invariant of the topological conjugacy of the system. In this paper we distinguish a class of three-dimensional Morse–Smale diffeomorphisms for which the complete invariant of topological conjugacy is the equivalence class of a link in S2 × S1. We prove that, if M is a link complement in S3, or a handlebody Hg of genus g ⩾ 0, or a closed, connected, orientable 3-manifold, then the set of equivalence classes of tame links in M is countable. As a corollary, we prove that there exists a countable number of equivalence classes of tame links in S2×S1. It is proved that any essential link can be realized by a diffeomorphism of the class under consideration",

author = "Bardakov, {V. g.} and Kozlovskaya, {T. a.} and Pochinka, {O. v.}",

note = "Links and Dynamics / V. G Bardakov, T. A. Kozlovskaya, O. V. Pochinka // Rus. J. Nonlin. Dyn., - 2025. - Vol. 21 (1). - P. 69-83. - DOI: 10.20537/nd241004",

year = "2025",

month = jan,

day = "1",

doi = "10.20537/nd241004",

language = "English",

volume = "21",

pages = "69--83",

journal = "Nelineinaya Dinamika",

issn = "2658-5324",

publisher = "Институт компьютерных исследований",

number = "1",

}

RIS

TY - JOUR

T1 - Links and Dynamics

AU - Bardakov, V. g.

AU - Kozlovskaya, T. a.

AU - Pochinka, O. v.

N1 - Links and Dynamics / V. G Bardakov, T. A. Kozlovskaya, O. V. Pochinka // Rus. J. Nonlin. Dyn., - 2025. - Vol. 21 (1). - P. 69-83. - DOI: 10.20537/nd241004

PY - 2025/1/1

Y1 - 2025/1/1

N2 - Knots naturally appear in continuous dynamical systems as flow periodic trajectories. However, discrete dynamical systems are also closely connected with the theory of knots and links. For example, for Pixton diffeomorphisms, the equivalence class of the Hopf knot, which is the orbit space of the unstable saddle separatrix in the manifold S2 × S1, is a complete invariant of the topological conjugacy of the system. In this paper we distinguish a class of three-dimensional Morse–Smale diffeomorphisms for which the complete invariant of topological conjugacy is the equivalence class of a link in S2 × S1. We prove that, if M is a link complement in S3, or a handlebody Hg of genus g ⩾ 0, or a closed, connected, orientable 3-manifold, then the set of equivalence classes of tame links in M is countable. As a corollary, we prove that there exists a countable number of equivalence classes of tame links in S2×S1. It is proved that any essential link can be realized by a diffeomorphism of the class under consideration

AB - Knots naturally appear in continuous dynamical systems as flow periodic trajectories. However, discrete dynamical systems are also closely connected with the theory of knots and links. For example, for Pixton diffeomorphisms, the equivalence class of the Hopf knot, which is the orbit space of the unstable saddle separatrix in the manifold S2 × S1, is a complete invariant of the topological conjugacy of the system. In this paper we distinguish a class of three-dimensional Morse–Smale diffeomorphisms for which the complete invariant of topological conjugacy is the equivalence class of a link in S2 × S1. We prove that, if M is a link complement in S3, or a handlebody Hg of genus g ⩾ 0, or a closed, connected, orientable 3-manifold, then the set of equivalence classes of tame links in M is countable. As a corollary, we prove that there exists a countable number of equivalence classes of tame links in S2×S1. It is proved that any essential link can be realized by a diffeomorphism of the class under consideration

UR - https://www.scopus.com/record/display.uri?eid=2-s2.0-105002439886&origin=inward&txGid=49fb78b8054a9499b0963071a12628de

U2 - 10.20537/nd241004

DO - 10.20537/nd241004

M3 - Article

VL - 21

SP - 69

EP - 83

JO - Nelineinaya Dinamika

JF - Nelineinaya Dinamika

SN - 2658-5324

IS - 1

ER -

ID: 65234808