This work considers the solution of the Neumann problem on a ring-shaped domain. First, the definition of the domain and the formulation of the Neumann boundary conditions on the inner and outer edges of the ring are provided. To solve the problem, the method of separation of variables in polar coordinates is used. The general solution of the Laplace equation in the ring is obtained, and then, by applying the Neumann boundary conditions, the coefficients in this general solution are determined. As an example, a specific Neumann boundary value problem on a ring is considered, thecoefficients in the general solution are calculated, and the final solution is constructed. This work can be useful in the study and solution of partial differential equations in ring-shaped domains
This work considers the solution of the Neumann problem on a ring-shaped domain. First, the definition of the domain and the formulation of the Neumann boundary conditions on the inner and outer edges of the ring are provided. To solve the problem, the method of separation of variables in polar coordinates is used. The general solution of the Laplace equation in the ring is obtained, and then, by applying the Neumann boundary conditions, the coefficients in this general solution are determined. As an example, a specific Neumann boundary value problem on a ring is considered, thecoefficients in the general solution are calculated, and the final solution is constructed. This work can be useful in the study and solution of partial differential equations in ring-shaped domains
№ | Имя автора | Должность | Наименование организации |
---|---|---|---|
1 | Bogdan . . | Student | Fergana State University |
№ | Название ссылки |
---|---|
1 | 1.N. Teshavoeva. Mathematician physics methodology. Fergana. Ukituvchi. 1980.2.M. Salokhiddinov. Mathematician physics tenglamalari. Tashkent. Uzbekistan. 2002.3.M. T. Rabbimov. Mathematics. Tashkent. Fan ziyoshi. 2022. –285 p.4.Kirsanov M.N. Maple 13 and Maplet. Solving mechanics problems. M.: Fizmatlit, 2010, 349 p.5.Galtsov D.V. Theoretical physics for mathematics students. –M.: Publishing house Mosk. University, 2003. –318 p.6.Ignatiev Yu.G. Mathematical and computer modeling of fundamental objects and phenomena in the Maple computer mathematics system. Lectures for school on mathematical modeling. / Kazan: Kazan University, 2014. -298 p.7.Matrosov A.V. Maple 6. Solving problems of higher mathematics and mechanics. –St. Petersburg: BHV-Petersburg. –2001.–528 p.8.Samarsky A. A., Mikhailov A. P. Mathematical modeling: Ideas. Methods. Examples. —2nd ed., rev. -M.: Fizmatlit, 2005. -320 p.9.MatrosovA.V. Maple 6. Solving problems of higher mathematics and mechanics. –St. Petersburg: BHV-Petersburg, 2001, 528 p.10.Budak B.N., Samarsky A.A., Tikhonov A.N. Collection of problems in mathematical physics. -M.: Fizmatlit, 2003.11.Vladimirov V.S., Zharinov V.V. Equations of mathematical physics. -M.: Fizmatlit, 2003. |