期刊
NUMERICAL METHODS FOR PARTIAL DIFFERENTIAL EQUATIONS
卷 25, 期 1, 页码 232-243出版社
WILEY
DOI: 10.1002/num.20341
关键词
collocation technique; compact finite difference scheme; high accuracy; linear hyperbolic equation
In this article. we introduce a high-order accurate method for solving the two dimensional linear hyperbolic equation. We apply a compact finite difference approximation of fourth order for discretizing spatial derivatives of linear hyperbolic equation and collocation method for the time component. The resulted method is unconditionally stable and solves the two-dimensional linear hyperbolic equation with high accuracy. In this technique, the solution is approximated by a polynomial at each grid point that its coefficients are determined by solving a linear system of equations. Numerical results show that the compact finite difference approximation of fourth order and collocation method give a very efficient approach for solving the two dimensional linear hyperbolic equation. (C) 2008 Wiley Periodicals. Inc. Numer Methods Partial Differential Eq 25: 232-243, 2009
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