An unconditionally stable ADI method for the linear hyperbolic equation in three space dimensions. (English) Zbl 0995.65093

Summary: An unconditionally stable alternating direction implicit (ADI) method of \(O(k^2+ h^2)\) of M. Lees type [J. Soc. Ind. Appl. Math. 10, 610-616 (1962; Zbl 0111.29204)] for solving the three space dimensional linear hyperbolic equation \(u_{tt}+ 2\alpha u_t+ \beta^2u= u_{xx}+ u_{yy}+ u_{zz}+ f(x,y,z,t)\), \(0< x, y\), \(z< 1\), \(t> 0\) subject to appropriate initial and Dirichlet boundary conditions is proposed, where \(\alpha> 0\) and \(\beta\geq 0\) are real numbers. For this method, we use a single computational cell. The resulting system of algebraic equations is solved by a three step split method. The new method is demonstrated by a suitable numerical example.


65M06 Finite difference methods for initial value and initial-boundary value problems involving PDEs
65M12 Stability and convergence of numerical methods for initial value and initial-boundary value problems involving PDEs
35L05 Wave equation
65F10 Iterative numerical methods for linear systems


Zbl 0111.29204
Full Text: DOI


[1] DOI: 10.1080/00207169508804400 · Zbl 0845.65046 · doi:10.1080/00207169508804400
[2] DOI: 10.1137/0110046 · Zbl 0111.29204 · doi:10.1137/0110046
[3] DOI: 10.1093/imamat/11.1.105 · Zbl 0259.65085 · doi:10.1093/imamat/11.1.105
[4] DOI: 10.1137/0706006 · Zbl 0175.16203 · doi:10.1137/0706006
[5] Jain M. K., ”Numerical solution of differential equations”, 2. ed. (1984) · Zbl 0536.65004
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