The Orlicz-Minkowski problem for torsional rigidity
Article Properties
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LanguageEnglish
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DOI (url)
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Publication Date2020/11/01
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Indian UGC (journal)
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Refrences47
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Citations10
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Ni Li
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Baocheng Zhu ORCID (unauthenticated)
Cite
Li, Ni, and Baocheng Zhu. “The Orlicz-Minkowski Problem for Torsional Rigidity”. Journal of Differential Equations, vol. 269, no. 10, 2020, pp. 8549-72, https://doi.org/10.1016/j.jde.2020.06.031.
Li, N., & Zhu, B. (2020). The Orlicz-Minkowski problem for torsional rigidity. Journal of Differential Equations, 269(10), 8549-8572. https://doi.org/10.1016/j.jde.2020.06.031
Li, Ni, and Baocheng Zhu. “The Orlicz-Minkowski Problem for Torsional Rigidity”. Journal of Differential Equations 269, no. 10 (2020): 8549-72. https://doi.org/10.1016/j.jde.2020.06.031.
Li N, Zhu B. The Orlicz-Minkowski problem for torsional rigidity. Journal of Differential Equations. 2020;269(10):8549-72.
Journal Category
Science
Mathematics
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Refrences
| Title | Journal | Journal Categories | Citations | Publication Date |
|---|---|---|---|---|
| The Orlicz-Petty bodies | International Mathematics Research Notices |
| 17 | 2018 |
| Hadamard variational formulas for p-torsion and p-eigenvalue with applications | Geometriae Dedicata |
| 10 | 2018 |
| The p-capacitary Orlicz–Hadamard variational formula and Orlicz–Minkowski problems | Calculus of Variations and Partial Differential Equations |
| 24 | 2018 |
| On the L Monge–Ampère equation | Journal of Differential Equations |
| 49 | 2017 |
| The Lp Minkowski problem for polytopes for p<0 | Indiana University Mathematics Journal |
| 35 | 2017 |
Refrences Analysis
| Category | Category Repetition |
|---|---|
| Science: Mathematics | 30 |
| Technology: Technology (General): Industrial engineering. Management engineering: Applied mathematics. Quantitative methods | 3 |
The category
Science: Mathematics 30
is the most frequently represented among the references in this article. It primarily includes studies from Advances in Mathematics and Mathematische Annalen. The chart below illustrates the number of referenced publications per year.
Refrences used by this article by year
Citations
| Title | Journal | Journal Categories | Citations | Publication Date |
|---|---|---|---|---|
| A flow to the Orlicz-Minkowski-type problem of p-capacity | Advances in Applied Mathematics |
| 2024 | |
| A Gauss curvature flow approach to the torsional Minkowski problem | Journal of Differential Equations |
| 2024 | |
| On the existence of solutions to the Orlicz–Minkowski problem for torsional rigidity | Archiv der Mathematik |
| 2 | 2023 |
The functional Orlicz–Brunn–Minkowski inequality for q‐torsional rigidity | Mathematika |
| 2023 | |
Existence of solution for Lp-Minkowski problem of 0 < p < 1 with measures in ℝn | International Journal of Mathematics |
| 2023 |
Citations Analysis
| Category | Category Repetition |
|---|---|
| Science: Mathematics | 8 |
| Technology: Technology (General): Industrial engineering. Management engineering: Applied mathematics. Quantitative methods | 4 |
The category
Science: Mathematics 8
is the most commonly referenced area in studies that cite this article. The first research to cite this article was titled The optimal problems for torsional rigidity and was published in 2021. The most recent citation comes from a 2024 study titled A flow to the Orlicz-Minkowski-type problem of p-capacity. This article reached its peak citation in 2023, with 4 citations. It has been cited in 10 different journals. Among related journals, the Advances in Applied Mathematics cited this research the most, with 1 citations. The chart below illustrates the annual citation trends for this article.