ISSN:
1230-3429
Website:
Publisher:
Uniwersytet Mikołaja Kopernika w Toruniu
Disciplines
(Field of Science):
- computer and information sciences (Natural sciences)
- mathematics (Natural sciences)
Ministry points: Help
Year | Points | List |
---|---|---|
Year 2024 | 100 | Ministry scored journals list 2024 |
Year | Points | List |
---|---|---|
2024 | 100 | Ministry scored journals list 2024 |
2023 | 100 | Ministry Scored Journals List |
2022 | 100 | Ministry Scored Journals List 2019-2022 |
2021 | 100 | Ministry Scored Journals List 2019-2022 |
2020 | 100 | Ministry Scored Journals List 2019-2022 |
2019 | 100 | Ministry Scored Journals List 2019-2022 |
2018 | 35 | A |
2017 | 35 | A |
2016 | 30 | A |
2015 | 25 | A |
2014 | 35 | A |
2013 | 35 | A |
2012 | 35 | A |
2011 | 35 | A |
2010 | 27 | A |
Model:
Traditional
Points CiteScore:
Year | Points |
---|---|
Year 2022 | 1.2 |
Year | Points |
---|---|
2022 | 1.2 |
2021 | 1.3 |
2020 | 1.3 |
2019 | 1.2 |
2018 | 1.5 |
2017 | 1.2 |
2016 | 1 |
2015 | 0.9 |
2014 | 1.2 |
2013 | 1.6 |
2012 | 1.3 |
2011 | 0.8 |
Impact Factor:
Log in to see the Impact Factor.
Publishing policy:
License:
Own Publisher's license
- License
- Own Publisher's license
- Information on publishing policy
- n/a
- Information on the conditions of self-archiving
- https://www.tmna.ncu.pl/web/guest/self-archiving-policy open in new tab
- Is self-archiving allowed by the journal?
- Yes - with restrictions
- Information on research data policy
- n/a
- Months of embargo
- 12
- Additional information
-
Must link to journal homepage with DOI.
The Author may be asked to provide research data.
Bronze Open Access after an embargo period of 60 months.
Self-archiving post-print after an embargo period of 12 months.
Sherpa Romeo:
Papers published in journal
Filters
total: 21
Catalog Journals
Year 2017
-
Weak forms of shadowing in topological dynamics
PublicationWe consider continuous maps of compact metric spaces. It is proved that every pseudotrajectory with sufficiently small errors contains a subsequence of positive density that is point-wise close to a subsequence of an exact trajectory with the same indices. Also, we study homeomor- phisms such that any pseudotrajectory can be shadowed by a finite number of exact orbits. In terms of numerical methods this property (we call it multishadowing)...
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