Tengjin Zhao scite author profile

This article proposes a class of high‐order energy‐preserving schemes for the improved Boussinesq equation. To derive the energy‐preserving schemes, we first discretize the improved Boussinesq equation by Fourier pseudospectral method, which leads to a finite‐dimensional Hamiltonian system. Then, the obtained semidiscrete system is solved by Hamiltonian boundary value methods, which is a newly developed class of energy‐preserving methods. The proposed schemes can reach spectral precision in space, and in time can reach second‐order, fourth‐order, and sixth‐order accuracy, respectively. Moreover, the proposed schemes can conserve the discrete mass and energy to within machine precision. Furthermore, to show the efficiency and accuracy of the proposed methods, the proposed methods are compared with the finite difference methods and the finite volume element method. The results of several numerical experiments are given for the propagation of the single solitary wave, the interaction of two solitary waves and the wave break‐up.

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A hybrid asymptotic and augmented compact finite volume method for nonlinear singular two point boundary value problems

Zhao

Zhang

Wang

2021

Applied Mathematics and Computation

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A hybrid augmented compact finite volume method for the Thomas–Fermi equation

Zhao

Zhang

Wang

2021

Mathematics and Computers in Simulation

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Finite Volume Element Approximation for the Elliptic Equation with Distributed Control

Wang

Zhao

Zhang

2018

International Journal of Differential Equations

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In this paper, we consider a priori error estimates for the finite volume element schemes of optimal control problems, which are governed by linear elliptic partial differential equation. The variational discretization approach is used to deal with the control. The error estimation shows that the combination of variational discretization and finite volume element formulation allows optimal convergence. Numerical results are provided to support our theoretical analysis.

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Tengjin Zhao

High‐order energy‐preserving schemes for the improved Boussinesq equation

A hybrid asymptotic and augmented compact finite volume method for nonlinear singular two point boundary value problems

A hybrid augmented compact finite volume method for the Thomas–Fermi equation

Finite Volume Element Approximation for the Elliptic Equation with Distributed Control

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