Full Article: PDF
Scientific Object Identifier: http://s-o-i.org/1.1/TAS-06-110-17
DOI: https://dx.doi.org/10.15863/TAS.2022.06.110.17
Language: English
Citation: Khalilov, A. J., & Ismatullayeva, G. Y. (2022). Solution of the dirichlet problem for the poisson equation in a complex domain in the maple system environment. ISJ Theoretical & Applied Science, 06 (110), 122- 127. Soi: http://s-o-i.org/1.1/TAS-06-110-17 Doi: https://dx.doi.org/10.15863/TAS.2022.06.110.17 |
Pages: 122-127
Published: 30.06.2022
Abstract: This work is devoted to modeling the solution of problems of bending and vibration of elastic and viscoelastic plates of arbitrary configuration for various friction models. The article discusses the Dirichlet boundary value problem for the Poisson equation in a complex domain. The proposed solution algorithm is shown in the Maple environment. As a result of the work, the corresponding solutions were obtained using the package of applied programs (procedures-libraries) developed to solve these issues. On the basis of the proposed algorithm, the problems of mechanics of a deformable solid body of arbitrary and complex configuration are solved.
Key words: Dirichlet problem, stiffness of viscoelastic plates, bending, Poisson's equations, Poisson's coefficient, R – function.
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