A Bochev‐Dohrmann‐Gunzburger stabilized method for Maxwell eigenproblem
Article Properties
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LanguageEnglish
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DOI (url)
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Publication Date2023/04/04
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Indian UGC (journal)
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Refrences22
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Citations1
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Zhijie Du School of Mathematics and Statistics Wuhan University Wuhan 430072 China
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Huoyuan Duan School of Mathematics and Statistics Wuhan University Wuhan 430072 China ORCID (unauthenticated)
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Can Wang School of Mathematics and Statistics Wuhan University Wuhan 430072 China
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Qiuyu Zhang School of Mathematics and Statistics Wuhan University Wuhan 430072 China
Abstract
Cite
Du, Zhijie, et al. “A Bochev‐Dohrmann‐Gunzburger Stabilized method for Maxwell Eigenproblem”. Numerical Methods for Partial Differential Equations, vol. 39, no. 5, 2023, pp. 3811-46, https://doi.org/10.1002/num.23026.
Du, Z., Duan, H., Wang, C., & Zhang, Q. (2023). A Bochev‐Dohrmann‐Gunzburger stabilized method for Maxwell eigenproblem. Numerical Methods for Partial Differential Equations, 39(5), 3811-3846. https://doi.org/10.1002/num.23026
Du, Zhijie, Huoyuan Duan, Can Wang, and Qiuyu Zhang. “A Bochev‐Dohrmann‐Gunzburger Stabilized method for Maxwell Eigenproblem”. Numerical Methods for Partial Differential Equations 39, no. 5 (2023): 3811-46. https://doi.org/10.1002/num.23026.
Du Z, Duan H, Wang C, Zhang Q. A Bochev‐Dohrmann‐Gunzburger stabilized method for Maxwell eigenproblem. Numerical Methods for Partial Differential Equations. 2023;39(5):3811-46.
Journal Categories
Science
Mathematics
Technology
Engineering (General)
Civil engineering (General)
Technology
Technology (General)
Industrial engineering
Management engineering
Applied mathematics
Quantitative methods
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Refrences
| Title | Journal | Journal Categories | Citations | Publication Date |
|---|---|---|---|---|
| On a discrete compactness property for the Nédélec finite elements | 1989 | |||
| Singularities of Electromagnetic Fields¶in Polyhedral Domains | Archive for Rational Mechanics and Analysis |
| 198 | 2000 |
| 10.1137/04061550X | ||||
| An Interior Penalty Method with C0Finite Elements for the Approximation of the Maxwell Equations in Heterogeneous Media: Convergence Analysis with Minimal Regularity | ESAIM: Mathematical Modelling and Numerical Analysis |
| 12 | 2016 |
| 10.1016/S0168-2024(08)70178-4 |
Citations
| Title | Journal | Journal Categories | Citations | Publication Date |
|---|---|---|---|---|
| Analysis of a direct discretization of the Maxwell eigenproblem | Applied Mathematics Letters |
| 2024 |
Citations Analysis
| Category | Category Repetition |
|---|---|
| Technology: Technology (General): Industrial engineering. Management engineering: Applied mathematics. Quantitative methods | 1 |
| Science: Mathematics | 1 |
The category
Technology: Technology (General): Industrial engineering. Management engineering: Applied mathematics. Quantitative methods 1
is the most commonly referenced area in studies that cite this article. The first research to cite this article was titled Analysis of a direct discretization of the Maxwell eigenproblem and was published in 2024. The most recent citation comes from a 2024 study titled Analysis of a direct discretization of the Maxwell eigenproblem. This article reached its peak citation in 2024, with 1 citations. It has been cited in 1 different journals. Among related journals, the Applied Mathematics Letters cited this research the most, with 1 citations. The chart below illustrates the annual citation trends for this article.