A. A. Halim, S. P. Kshevetskii, S. B. Leble
Published 2002-11-28Version 1
We introduce a numerical method for general coupled Korteweg-de Vries systems. The scheme is valid for solving Cauchy problems for arbitrary number of equations with arbitrary constant coefficients. The numerical scheme takes its legality by proving its stability and convergence which gives the conditions and the appropriate choice of the grid sizes. The method is applied to Hirota-Satsuma (HS) system and compared with its known explicit solution investigating the influence of initial conditions and grid sizes on accuracy. We also illustrate the method to show the effects of constants with a transition to non-integrable cases.
Comments: 11 pages, 13 figures
Numerical integration of Hölder continuous, absolutely convergent Fourier-, Fourier cosine-, and Walsh series
The Curse of Dimensionality for Numerical Integration of Smooth Functions II
Hopf algebras of formal diffeomorphisms and numerical integration on manifolds
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