Annales Mathematicae Silesianae - Journal - Bridge of Knowledge

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Annales Mathematicae Silesianae

ISSN:

0860-2107

eISSN:

2391-4238

Website:

https://journals.us.edu.pl/index.php/AMSIL/ open in new tab
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http://www.math.us.edu.pl/annales/ open in new tab

Publisher:

Uniwersytet Śląski w Katowicach , Walter de Gruyter (Sciendo)

Disciplines
(Field of Science):

  • mathematics (Natural sciences)

Ministry points: Help

Ministry points - current year
Year Points List
Year 2025 40 Ministry scored journals list 2024
Ministry points - previous years
Year Points List
2025 40 Ministry scored journals list 2024
2024 40 Ministry scored journals list 2024
2023 40 Ministry Scored Journals List
2022 40 Ministry Scored Journals List 2019-2022
2021 40 Ministry Scored Journals List 2019-2022
2020 40 Ministry Scored Journals List 2019-2022
2019 40 Ministry Scored Journals List 2019-2022
2018 9 B
2017 9 B
2016 9 B
2015 9 B
2014 5 B
2013 5 B
2012 4 B
2011 4 B
2010 6 B

Model:

Open Access

Points CiteScore:

Points CiteScore - current year
Year Points
Year 2023 0.6
Points CiteScore - previous years
Year Points
2023 0.6
2022 0.9
2021 0.1
2020 0

Impact Factor:

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Publishing policy:

License: CC BY 4.0
License
Creative Commons: BY 4.0 open in new tab
Information on publishing policy
https://journals.us.edu.pl/index.php/AMSIL/about/submissions open in new tab
Information on the conditions of self-archiving
Included in license
Is self-archiving allowed by the journal?
Yes - without restrictions
Submitted Version Help
yes
Accepted Version Help
yes
Published Version Help
yes
Information on research data policy
n/a
Months of embargo
no embargo
Additional information
Indexed in DOAJ
Must link to journal homepage with DOI.

Sherpa Romeo:

https://v2.sherpa.ac.uk/id/publication/43257

Papers published in journal

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total: 1

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Catalog Journals

Year 2023
  • A Generalized Version of the Lions-Type Lemma
    Publication

    - Annales Mathematicae Silesianae - Year 2023

    In this short paper, I recall the history of dealing with the lack of compactness of a sequence in the case of an unbounded domain and prove the vanishing Lions-type result for a sequence of Lebesgue-measurable functions. This lemma generalizes some results for a class of Orlicz–Sobolev spaces. What matters here is the behavior of the integral, not the space

    Full text available to download

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