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International Journal for Multiscale Computational Engineering

年間 6 号発行

ISSN 印刷: 1543-1649

ISSN オンライン: 1940-4352

The Impact Factor measures the average number of citations received in a particular year by papers published in the journal during the two preceding years. 2017 Journal Citation Reports (Clarivate Analytics, 2018) IF: 1.4 To calculate the five year Impact Factor, citations are counted in 2017 to the previous five years and divided by the source items published in the previous five years. 2017 Journal Citation Reports (Clarivate Analytics, 2018) 5-Year IF: 1.3 The Immediacy Index is the average number of times an article is cited in the year it is published. The journal Immediacy Index indicates how quickly articles in a journal are cited. Immediacy Index: 2.2 The Eigenfactor score, developed by Jevin West and Carl Bergstrom at the University of Washington, is a rating of the total importance of a scientific journal. Journals are rated according to the number of incoming citations, with citations from highly ranked journals weighted to make a larger contribution to the eigenfactor than those from poorly ranked journals. Eigenfactor: 0.00034 The Journal Citation Indicator (JCI) is a single measurement of the field-normalized citation impact of journals in the Web of Science Core Collection across disciplines. The key words here are that the metric is normalized and cross-disciplinary. JCI: 0.46 SJR: 0.333 SNIP: 0.606 CiteScore™:: 3.1 H-Index: 31

Indexed in

ON TWO-SCALE ANALYSIS OF HETEROGENEOUS MATERIALS BY MEANS OF THE MESHLESS FINITE DIFFERENCE METHOD

巻 14, 発行 2, 2016, pp. 25-43
DOI: 10.1615/IntJMultCompEng.2016014435
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要約

The finite element (FE) method is the commonly applied engineering tool for numerical analysis of heterogeneous materials. The FE solution approach is successfully applied at all analysis levels, including the macro (material at large) and the micro (e.g., representative volume element) ones. However, this paper focuses on an alternative, perhaps more effective approach, based upon the meshless discretization and approximation. The aim of this paper is to present the formulation of the numerical homogenization in terms of the meshless finite difference method, as well as the results of the selected two-dimensional linear elasticity examples. Moreover, several benefits of the proposed approach are highlighted, especially toward analysis of more complex engineering problems.

によって引用された
  1. Qu Wenzhen, Gu Yan, Zhang Yaoming, Fan Chia-Ming, Zhang Chuanzeng, A combined scheme of generalized finite difference method and Krylov deferred correction technique for highly accurate solution of transient heat conduction problems, International Journal for Numerical Methods in Engineering, 117, 1, 2019. Crossref

  2. Jaworska Irena, Application of the multipoint meshless FDM to chosen demanding problems, 2078, 2019. Crossref

  3. Zhao Qinghai, Fan Chia-Ming, Wang Fajie, Qu Wenzhen, Topology optimization of steady-state heat conduction structures using meshless generalized finite difference method, Engineering Analysis with Boundary Elements, 119, 2020. Crossref

  4. Korkut Fuat, Mengi Yalcin, Tokdemir Turgut, On the use of complex stretching coordinates in generalized finite difference method with applications in inhomogeneous visco-elasto dynamics, Engineering Analysis with Boundary Elements, 134, 2022. Crossref

  5. Jaworska Irena, Generalization of the Multipoint meshless FDM application to the nonlinear analysis, Computers & Mathematics with Applications, 87, 2021. Crossref

  6. Oh Miewleng, Yeak Suhoe, A Hybrid Multiscale Finite Cloud Method and Finite Volume Method in Solving High Gradient Problem, International Journal of Computational Methods, 19, 04, 2022. Crossref

  7. Jaworska Irena, Multipoint Meshless FD Schemes Applied to Nonlinear and Multiscale Analysis, in Computational Science – ICCS 2022, 13353, 2022. Crossref

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