论文信息 - On the numerical study of the KdV equation by the Semi-Implicit and Leap-frog Method

On the numerical study of the KdV equation by the Semi-Implicit and Leap-frog Method

A numerical study of the Korteweg-de Vries (KdV) Equation by means of a new but simple scheme, called the Semi-Implicit Method (SIM), is presented in this paper. The basic idea behind the SIM is to approximate the nonlinear term in the original equation by a product of terms in the previous and present time steps. Comparison of this scheme to the well-known Leap-frog Method (LFM) proposed by Zabusky et al. shows that the SIM is a faster scheme. Besides, it is an unconditionally stable method whereas the LFM is only a conditionally stable scheme.

Ping-Wah Li

[1] Wolfgang Kerner,et al. Semi-implicit method for three-dimensional compressible magnetohydrodynamic simulation☆ , 1985 .

[2] N. Zabusky,et al. Interaction of "Solitons" in a Collisionless Plasma and the Recurrence of Initial States , 1965 .

[3] J. Gibbon,et al. Solitons and Nonlinear Wave Equations , 1982 .

[4] P. Drazin,et al. Solitons: An Introduction , 1989 .