Abstract
We study various weaker forms of the inverse shadowing property for discrete dynamical systems on a smooth compact manifold. First, we introduce the so-called ergodic inverse shadowing property (Birkhoff averages of continuous functions along an exact trajectory and the approximating one are close). We demonstrate that this property implies the continuity of the set of invariant measures in the Hausdorff metric. We show that the class of systems with ergodic inverse shadowing is quite broad; it includes all diffeomorphisms with hyperbolic nonwandering sets. Second, we study the so-called individual inverse shadowing (any exact trajectory can be traced by approximate ones, but this shadowing is not uniform with respect to the initial point of the trajectory). We demonstrate that this property is closely related to structural stability and Ω-stability of diffeomorphisms.
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Full text
- Publication version
- Accepted or Published Version
- DOI:
- Digital Object Identifier (open in new tab) 10.1007/s11425-019-1609-8
- License
- Copyright (2020 Science China Press and Springer-Verlag GmbH Germany, part of Springer Nature)
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- Category:
- Articles
- Type:
- artykuły w czasopismach
- Published in:
-
Science China-Mathematics
no. 63,
pages 1825 - 1836,
ISSN: 1674-7283 - Language:
- English
- Publication year:
- 2020
- Bibliographic description:
- Kryzhevich S., Pilyugin S.: Inverse shadowing and related measures// Science China-Mathematics -, (2020), s.1825-1836
- DOI:
- Digital Object Identifier (open in new tab) 10.1007/s11425-019-1609-8
- Sources of funding:
-
- Free publication
- Verified by:
- Gdańsk University of Technology
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