Analysis of Numerical Differential Formulas on a Bakhvalov Mesh in the Presence of a Boundary Layer Научная публикация
| Журнал |
Computational Mathematics and Mathematical Physics
ISSN: 0965-5425 , E-ISSN: 1555-6662 |
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| Вых. Данные | Год: 2023, Том: 63, Номер: 2, Страницы: 175-183 Страниц : 9 DOI: 10.1134/s0965542523020148 | ||
| Ключевые слова | function of one variable, exponential boundary layer, Bakhvalov mesh, Lagrange polynomial, numerical differentiation formulas, error estimate | ||
| Авторы |
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| Организации |
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Информация о финансировании (2)
| 1 | Омский филиал ФГБУН «Институт математики им. С.Л. Соболева СО РАН». | FWNF-2022-0016 |
| 2 | Российский фонд фундаментальных исследований | 20-01-00650 |
Реферат:
The paper considers numerical differentiation of functions with large gradients in the region of an exponential boundary layer. This topic is important, since the application of classical polynomial difference formulas for derivatives to such functions in the case of a uniform mesh leads to unacceptable errors if the perturbation parameter is comparable with the mesh size. The numerical differentiation formula with a given number of nodes in the difference stencil is built on subintervals covering the original interval. The accuracy of numerical differentiation formulas on a Bakhvalov mesh, which is widely used in the construction of difference schemes for singularly perturbed problems, is analyzed. For the original function of one variable, a representation in the form of a sum of regular and boundary-layer components, based on the Shishkin decomposition, is used to solve a singularly perturbed problem. Previously, such a decomposition was used to prove the convergence of difference schemes. An estimate of the error of classical polynomial formulas for numerical differentiation on a Bakhvalov mesh is obtained. The error estimate on a Bakhvalov mesh is obtained in the general case, when a derivative of an arbitrarily given order is calculated and the difference stencil for this derivative contains a given number of nodes. The error estimate depends on the order of the calculated derivative and the number of nodes in difference stencil and takes into account the uniformity in the parameter . The results of numerical experiments are presented, which are consistent with the error estimates obtained.
Библиографическая ссылка:
Zadorin A.I.
Analysis of Numerical Differential Formulas on a Bakhvalov Mesh in the Presence of a Boundary Layer
Computational Mathematics and Mathematical Physics. 2023. V.63. N2. P.175-183. DOI: 10.1134/s0965542523020148 WOS Scopus РИНЦ OpenAlex
Analysis of Numerical Differential Formulas on a Bakhvalov Mesh in the Presence of a Boundary Layer
Computational Mathematics and Mathematical Physics. 2023. V.63. N2. P.175-183. DOI: 10.1134/s0965542523020148 WOS Scopus РИНЦ OpenAlex
Оригинальная:
Задорин А.И.
Анализ формул численного дифференцирования на сетке Бахвалова при наличии пограничного слоя
Журнал вычислительной математики и математической физики. 2023. Т.63. №2. С.218-226. DOI: 10.31857/S0044466923020163 РИНЦ OpenAlex
Анализ формул численного дифференцирования на сетке Бахвалова при наличии пограничного слоя
Журнал вычислительной математики и математической физики. 2023. Т.63. №2. С.218-226. DOI: 10.31857/S0044466923020163 РИНЦ OpenAlex
Даты:
| Поступила в редакцию: | 12 апр. 2022 г. |
| Принята к публикации: | 11 авг. 2022 г. |
| Опубликована в печати: | 9 апр. 2023 г. |
| Опубликована online: | 9 апр. 2023 г. |
Идентификаторы БД:
| Web of science: | WOS:000967520800002 |
| Scopus: | 2-s2.0-85160275854 |
| РИНЦ: | 61294664 |
| OpenAlex: | W4363603922 |