DDC
| 005.7 |
Tác giả CN
| Dang, Quang A |
Nhan đề
| Numerical Method For Solving The Dirichlet Boundary Value Problem For Nonlinear Triharmonic Equation / Dang Quang A, Nguyen Quoc Hung, Vu Vinh Quang |
Tóm tắt
| In this work, we consider the Dirichlet boundary value problem for nonlinear Tihmonic equation. Due to the reduction of the problem to operator equation for the pair of tr: right hand function and the unknown second normal derivative of the function to be we design iterative method at both continuous and discrete levels for numerical solution problem. Some examples demonstrate that the numerical method is of fourth order convergeze. “hen the hand side function does not depend on the unknown function and its deritatives- numerical method gives more accurate results in comparison with the results obtained by the firefly: method Gudi and Neilan. |
Từ khóa tự do
| Dirichlet boundary value problem |
Từ khóa tự do
| Iterative method |
Từ khóa tự do
| Nonlinear triharmonic equation |
Nguồn trích
| Tạp chí Tin học và Điều khiển học = Journal of Computer Science And Cybernetics 2022tr. 80-90
Số: 02 |
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005 | 202409271544 |
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040 | |aACTVN |
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044 | |avm |
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082 | |a005.7 |
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100 | 10|aDang, Quang A |
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245 | |aNumerical Method For Solving The Dirichlet Boundary Value Problem For Nonlinear Triharmonic Equation / |cDang Quang A, Nguyen Quoc Hung, Vu Vinh Quang |
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520 | |aIn this work, we consider the Dirichlet boundary value problem for nonlinear Tihmonic equation. Due to the reduction of the problem to operator equation for the pair of tr: right hand function and the unknown second normal derivative of the function to be we design iterative method at both continuous and discrete levels for numerical solution problem. Some examples demonstrate that the numerical method is of fourth order convergeze. “hen the hand side function does not depend on the unknown function and its deritatives- numerical method gives more accurate results in comparison with the results obtained by the firefly: method Gudi and Neilan. |
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653 | |aDirichlet boundary value problem |
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653 | |aIterative method |
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653 | |aNonlinear triharmonic equation |
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773 | 0 |tTạp chí Tin học và Điều khiển học = Journal of Computer Science And Cybernetics |d2022|gtr. 80-90|x1813-9663|i02 |
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890 | |a0|b0|c1|d0 |
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