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Disciplines
(Field of Science):
- mathematics (Natural sciences)
- physical sciences (Natural sciences)
Ministry points: Help
Year | Points | List |
---|---|---|
Year 2024 | 70 | Ministry scored journals list 2024 |
Year | Points | List |
---|---|---|
2024 | 70 | Ministry scored journals list 2024 |
2023 | 70 | Ministry Scored Journals List |
2022 | 70 | Ministry Scored Journals List 2019-2022 |
2021 | 70 | Ministry Scored Journals List 2019-2022 |
2020 | 70 | Ministry Scored Journals List 2019-2022 |
2019 | 70 | Ministry Scored Journals List 2019-2022 |
2018 | 20 | A |
2017 | 20 | A |
2016 | 20 | A |
2015 | 15 | A |
2014 | 20 | A |
2013 | 15 | A |
2012 | 20 | A |
2011 | 20 | A |
2010 | 13 | A |
Model:
Points CiteScore:
Year | Points |
---|---|
Year 2023 | 1.8 |
Year | Points |
---|---|
2023 | 1.8 |
2022 | 1.4 |
2021 | 1.3 |
2020 | 1.6 |
2019 | 1.4 |
2018 | 1.5 |
2017 | 1.2 |
2016 | 1.5 |
2015 | 1.6 |
2014 | 1.7 |
2013 | 1.5 |
2012 | 1.3 |
2011 | 1.2 |
Impact Factor:
Publishing policy:
- License
- COPYRIGHT
- Information on publishing policy
- n/a
- Information on the conditions of self-archiving
- n/a
- Is self-archiving allowed by the journal?
- Yes - with restrictions
- Information on research data policy
- n/a
- Months of embargo
- no embargo
- Additional information
-
The Authors can archive their Submitted Version on arXiv platform.
Self-archiving policy based on correspondence with the editors.
Sherpa Romeo:
Papers published in journal
Filters
total: 2
Catalog Journals
Year 2018
-
Simple Fractal Calculus from Fractal Arithmetic
PublicationNon-Newtonian calculus that starts with elementary non-Diophantine arithmetic operations of a Burgin type is applicable to all fractals whose cardinality is continuum. The resulting definitions of derivatives and integrals are simpler from what one finds in the more traditional literature of the subject, and they often work in the cases where the standard methods fail. As an illustration, we perform a Fourier transform of a real-valued...
Year 2010
-
General solution of quantum mechanical equations of motion with time-dependent Hamiltonians: A Lie algebraic approach
PublicationThe unitary operators U(t), describing the quantum time evolution of systems with a time-dependent Hamiltonian, can be constructed in an explicit manner using the method of time-dependent invariants. We clarify the role of Lie-algebraic techniques in this context and elaborate the theory for SU(2) and SU(1,1). In these cases we give explicit formulae for obtaining general solutions from special ones. We show that the constructions...
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