Zhurnal Srednevolzhskogo Matematicheskogo Obshchestva
RUS  ENG    JOURNALS   PEOPLE   ORGANISATIONS   CONFERENCES   SEMINARS   VIDEO LIBRARY   PACKAGE AMSBIB  
General information
Latest issue
Archive
Guidelines for authors

Search papers
Search references

RSS
Latest issue
Current issues
Archive issues
What is RSS



Zhurnal SVMO:
Year:
Volume:
Issue:
Page:
Find






Personal entry:
Login:
Password:
Save password
Enter
Forgotten password?
Register


Zhurnal Srednevolzhskogo Matematicheskogo Obshchestva, 2023, Volume 25, Number 4, Pages 273–283
DOI: https://doi.org/10.15507/2079-6900.25.202304.273-283
(Mi svmo867)
 

Mathematics

Superstructures over Cartesian products of orientation-preserving rough circle transformations

S. Kh. Zininaa, A. A. Nozdrinovb, V. I. Shmuklerb

a Ogarev Mordovia State University, Saransk
b National Research University – Higher School of Economics in Nizhny Novgorod
References:
Abstract: One of the constructions for obtaining flows on a manifold is building a superstructure over a cascade. In this case, the flow is non-singular, that is, it has no fixed points. C. Smale showed that superstructures over conjugate diffeomorphisms are topologically equivalent. The converse statement is not generally true, but under certain assumptions the conjugacy of diffeomorphisms is tantamount to equivalence of superstructures. Thus, J. Ikegami showed that the criterion works in the case when a diffeomorphism is given on a manifold whose fundamental group does not admit an epimorphism into the group $\mathbb Z$. He also constructed examples of non-conjugate diffeomorphisms of a circle whose superstructures are equivalent. In the work of I. V. Golikova and O. V. Pochinka superstructures over diffeomorphisms of circles are examined. It is also proven in this paper that the complete invariant of the equivalence of superstructures over orientation-preserving diffeomorphisms is the equality of periods for periodic points generating their diffeomorphisms. For the other side, it is known from the result of A.G. Mayer that the coincidence of rotation numbers is also necessary for conjugacy of orientation-preserving diffeomorphisms. At the same time, superstructures over orientation-changing diffeomorphisms of circles are equivalent if and only if the corresponding diffeomorphisms of circles are topologically conjugate. Work of S. Kh. Zinina and P. I. Pochinka proved that superstructures over orientation-changing Cartesian products of diffeomorphisms of circles are equivalent if and only if the corresponding diffeomorphisms of tori are topologically conjugate. In this paper a classification result is obtained for superstructures over Cartesian products of orientation-preserving diffeomorphisms of circles.
Keywords: manifold, superstructure over a diffeomorphism, orientation-preserving diffeomorphism of a circle, number of rotations, Cartesian product of diffeomorphisms
Funding agency Grant number
Russian Science Foundation 23-71-30008
Document Type: Article
UDC: 515.163
MSC: 37D15
Language: Russian
Citation: S. Kh. Zinina, A. A. Nozdrinov, V. I. Shmukler, “Superstructures over Cartesian products of orientation-preserving rough circle transformations”, Zhurnal SVMO, 25:4 (2023), 273–283
Citation in format AMSBIB
\Bibitem{ZinNozShm23}
\by S.~Kh.~Zinina, A.~A.~Nozdrinov, V.~I.~Shmukler
\paper Superstructures over Cartesian products of orientation-preserving rough circle transformations
\jour Zhurnal SVMO
\yr 2023
\vol 25
\issue 4
\pages 273--283
\mathnet{http://mi.mathnet.ru/svmo867}
\crossref{https://doi.org/10.15507/2079-6900.25.202304.273-283}
Linking options:
  • https://www.mathnet.ru/eng/svmo867
  • https://www.mathnet.ru/eng/svmo/v25/i4/p273
  • Citing articles in Google Scholar: Russian citations, English citations
    Related articles in Google Scholar: Russian articles, English articles
    Zhurnal Srednevolzhskogo Matematicheskogo Obshchestva
    Statistics & downloads:
    Abstract page:31
    Full-text PDF :20
    References:19
     
      Contact us:
     Terms of Use  Registration to the website  Logotypes © Steklov Mathematical Institute RAS, 2024