论文信息 - An unconditionally stable difference scheme for the one-space-dimensional linear hyperbolic equation

An unconditionally stable difference scheme for the one-space-dimensional linear hyperbolic equation

Abstract An implicit three-level difference scheme of O(k2 + h2) is discussed for the numerical solution of the linear hyperbolic equation utt + 2αut + β2u = uxx + f(x, t), α > β ≥ 0, in the region Ω = {(x,t) ∥ 0 0} subject to appropriate initial and Dirichlet boundary conditions, where α and β are real numbers. We have used nine grid points with a single computational cell. The proposed scheme is unconditionally stable. The resulting system of algebraic equations is solved by using a tridiagonal solver. Numerical results demonstrate the required accuracy of the proposed scheme.

R. K. Mohanty

[1] G. Dahlquist. On accuracy and unconditional stability of linear multistep methods for second order differential equations , 1978 .

[2] R. K. Mohanty,et al. An unconditionally stable alternating direction implicit scheme for the two space dimensional linear hyperbolic equation , 2001 .

[3] Arieh Iserles,et al. Numerical Solution of Differential Equations , 2006 .

[4] R. K. Mohanty,et al. On the use of high order difference methods for the system of one space second order nonlinear hyperbolic equations with variable coefficients , 1996 .

[5] L. Debnath. Nonlinear Partial Differential Equations for Scientists and Engineers , 1997 .

[6] M. Ciment,et al. A note on the operator compact implicit method for the wave equation , 1978 .

[7] R. K. Mohanty,et al. An Unconditionally Stable ADI Method for the Linear Hyperbolic Equation in Three Space Dimensions , 2002, Int. J. Comput. Math..

[8] E. H. Twizell. An explicit difference method for the wave equation with extended stability range , 1979 .