A numerical scheme based on mean value solutions for the helmholtz equation on triangular grids |
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| Authors: | M. G. Andrade J. B. R. do Val. |
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| Affiliation: | Depto. de Ciencias de Computacao e Estatistica, Instituto de Ciencias Matematica de Sao Carlos, Universidade de Sao Paulo, C.P. 668 - Sao Carlos - SP, 13.560-970 - Brasil ; Depto. de Telemática, Fac. de Eng. Elétrica, Universidade Estadual de Campinas - UNICAMP, C.P. 6101, 13081-970 - Campinas - SP, Brasil |
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| Abstract: | A numerical treatment for the Dirichlet boundary value problem on regular triangular grids for homogeneous Helmholtz equations is presented, which also applies to the convection-diffusion problems. The main characteristic of the method is that an accuracy estimate is provided in analytical form with a better evaluation than that obtained with the usual finite difference method. Besides, this classical method can be seen as a truncated series approximation to the proposed method. The method is developed from the analytical solutions for the Dirichlet problem on a ball together with an error evaluation of an integral on the corresponding circle, yielding  accuracy. Some numerical examples are discussed and the results are compared with other methods, with a consistent advantage to the solution obtained here. |
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| Keywords: | Numerical solutions for partial differential equations elliptic differential equations Helmholtz equations non-standard difference approximation convection-diffusion equations |
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