CONSTRUCTION OF A HIGH-PRECISION APPROXIMATE SOLUTION INTEGRAL WIENER-HOPF EQUATION ON THE SEGMENT
- 作者: Evdokimova O.V1, Babeshko V.A1,2, Pavlova A.V2
-
隶属关系:
- Federal Research Centre the Southern Scientific Centre of the Russian Academy of Sciences
- Kuban State University
- 期: 卷 19, 编号 2 (2023)
- 页面: 3-5
- 栏目: Articles
- URL: https://journals.eco-vector.com/2500-0640/article/view/627579
- DOI: https://doi.org/10.7868/S25000640230201
- ID: 627579
如何引用文章
详细
A new rather simple and, at the same time, high-precision method for solving Wiener-Hopf integral equations on a finite segment is proposed. Previously, when solving these equations, it was not possible to construct a single solution that is valid for all segment sizes. Various asymptotic and approximate methods have been constructed for large and small relative segments, which complicates the efficiency of the study. In this paper, on the basis of projection and factorization methods, including those developed by the authors, an approach is proposed that allows constructing a single solution for all relative sizes of the segment of the integral equation assignment. The type of properties of the kernels of integral equations for which this method is applicable is indicated in the article.
作者简介
O. Evdokimova
Federal Research Centre the Southern Scientific Centre of the Russian Academy of Sciences
Email: ras@ssc-ras.ru
Rostov-on-Don, Russian Federation
V. Babeshko
Federal Research Centre the Southern Scientific Centre of the Russian Academy of Sciences; Kuban State University
Email: babeshko41@mail.ru
Rostov-on-Don, Russian Federation; Krasnodar, Russian Federation
A. Pavlova
Kuban State University
Email: rector@kubsu.ru
Krasnodar, Russian Federation
参考
- Ворович И.И., Александров В.М., Бабешко В.А. 1974. Неклассические смешанные задачи теории упругости. М., Наука: 456 с.
- Калинчук В.В. Белянкова Т.И. 2009. Динамика поверхности неоднородных сред. М., Физматлит: 312 с.
- Freund L.B. 1998. Dynamic fracture mechanics. Cambridge, Cambridge University Press: 520 p.
- Achenbach J.D. 1973. Wave propagation in elastic solids. Amsterdam, North-Holland: 480 p.
- Litvinchuk G.S., Spitkoskii I.M. 1987. Factorization of measurable matrix functions. Basel, Boston, Birkhäuser Verlag: 372 p.
- Нобл Б. 1962. Метод Винера ‒ Хопфа. М., Издательство иностранной литературы: 280 с.
- Brockwell P.J., Davis R.A. 2002. Introduction to time series and forecasting. New York, Springer: 610 p.
- Бабешко В.А. 1984. Обобщенный метод факторизации в пространственных динамических смешанных задачах теории упругости. М., Наука: 256 с.
- Гохберг И.Ц., Крейн М.Г. 1967. Теория вольтерровых операторов в гильбертовом пространстве и ее приложения. М., Наука: 508 с.
补充文件
![](/img/style/loading.gif)