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Spectrally accurate energy‐preserving methods for the numerical solution of the “good” Boussinesq equation |
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| Authors: | Luigi Brugnano Gianmarco Gurioli Chengjian Zhang |
| Abstract: | In this paper we study the geometric numerical solution of the so called “good” Boussinesq equation. This goal is achieved by using a convenient space semi‐discretization, able to preserve the corresponding Hamiltonian structure, then using energy‐conserving Runge–Kutta methods in the Hamiltonian boundary value method class for the time integration. Numerical tests are reported, confirming the effectiveness of the proposed method. |
| Keywords: | blended iteration energy‐conserving methods “ good” Boussinesq equation Hamiltonian boundary value methods Hamiltonian PDEs spectral methods |