期刊
NUMERICAL METHODS FOR PARTIAL DIFFERENTIAL EQUATIONS
卷 38, 期 4, 页码 1112-1143出版社
WILEY
DOI: 10.1002/num.22836
关键词
coupled; decoupled; DGSRLW equations; discrete energy method; dissipative; finite difference scheme
资金
- Fujian Key Laboratory of Data Science and Statistics
- Institute of Meteorological Big Data-Digital Fujian
- Natural Science Foundation of Fujian Province [2020J01796]
Two coupled and decoupled dissipative finite difference schemes with high-order accuracy are proposed for solving the dissipative generalized symmetric regularized long wave equations in this paper. Dissipation of the discrete energy with different parameters is discussed, and the a priori estimate, existence and uniqueness of numerical solutions, convergence with O(tau 2+h4), and stability of the schemes are proved by the discrete energy method. Numerical examples are provided to support the theoretical analysis.
In this paper, two coupled and decoupled dissipative finite difference schemes with high-order accuracy are proposed for solving the dissipative generalized symmetric regularized long wave equations. Dissipation of the discrete energy of scheme with different parameters is discussed. A priori estimate, existence and uniqueness of numerical solutions, convergence with O(tau 2+h4) and stability of the schemes are proved by the discrete energy method. Numerical examples are given to support the theoretical analysis.
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