A numerical scheme to solve the Korteweg-de Vries equation

The Korteweg-de Vries equation is numerically solved by using a new algorithm based on the quintic sphne approximation. An iterative scheme having 0(k2 + kh2) accuracy and five-band constant coefficients system of equations is devised. The stability of the proposed scheme is discussed. Comparisons

A separation method is introduced within the context of dynamical system for solving the non-linear Korteweg-de Vries equation (KdV). Best efficiency is obtained for the number of iterations (n 6 8). Comparisons with the solutions of the quintic spline, finite difference, moving mesh and pseudo-spec

But we shall study it elsewhere. An unconventional numerical method for solving a restrictive and yet often-encountered class of ordinary differential equations is In general a system of ordinary differential equations proposed. The method has a crucial, what we call reflexive, property for which f

We consider a stochastic Korteweg de Vries equation forced by a random term of white noise type. This can be a model of water waves on a fluid submitted to a random pressure. We prove existence and uniqueness of solutions in H 1 (R) in the case of additive noise and existence of martingales solution