Vibrations in Physical Systems - Journal - Bridge of Knowledge

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Vibrations in Physical Systems

ISSN:

0860-6897

Publisher:

Politechnika Poznańska

Disciplines
(Field of Science):

  • biomedical engineering (Engineering and Technology)
  • civil engineering, geodesy and transport (Engineering and Technology)
  • materials engineering (Engineering and Technology)
  • mechanical engineering (Engineering and Technology)

Ministry points: Help

Ministry points - current year
Year Points List
Year 2024 70 Ministry scored journals list 2024
Ministry points - previous years
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 5 B
2017 5 B
2016 5 B
2015 5 B
2014 4 B
2013 4 B
2010 6 B

Model:

Open Access

Points CiteScore:

Points CiteScore - current year
Year Points
Year 2023 0.7
Points CiteScore - previous years
Year Points
2023 0.7
2022 0.6
2021 0.6
2020 0.5
2019 0.6
2018 0.6
2017 0.6
2016 0.4
2015 0.4
2014 0.2
2013 0
2012 0

Impact Factor:

n/a

Publishing policy:

License: CC BY 4.0
License
Creative Commons: BY 4.0 open in new tab
Information on publishing policy
https://vibsys.put.poznan.pl/ethical-guideline/ 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
no
Accepted Version Help
no
Published Version Help
yes
Information on research data policy
n/a
Months of embargo
no embargo
Additional information
Must link to journal homepage with DOI.
The Creative Commons license is listed next to the articles.

Filters

total: 17

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Catalog Journals

Year 2024
Year 2023
Year 2022
Year 2021
Year 2019
Year 2016
Year 2014
  • The modelling method of discrete-continuous systems
    Publication

    The paper introduces a method of discrete-continuous systems modelling. In the proposed method a three-dimensional system is divided into finite elements in only two directions, with the third direction remaining continuous. The thus obtained discrete-continuous model is described by a set of partial differential equations. General difference equations of discrete system are obtained using the rigid finite element method. The limit...

    Full text available to download

Year 2012
Year 2010
  • Hybrid Reduced Model of Continuous System

    The paper introduces an alternative method of modelling and modal reduction of continuous systems. Presented method is a hybrid one. It combines the advantages of modal decomposition method and the rigid finite element method. In the proposed method continuous structure is divided into one-dimensional continuous elements. For each 1D element modal decomposition and reduction is applied. Interactions between substructures are...

    Full text available to download

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