A generalized trial solution method for solving the aerosol equation

form solution Delay differential equation a b s t r a c t The variational iteration method is applied to solve the generalized pantograph equation. This technique provides a sequence of functions which converges to the exact solution of the problem and is based on the use of Lagrange multipliers fo

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

dq N dp N ϭ const, (3a) A numerical method for the time evolution of systems described by Liouville-type equations is derived. The algorithm uses a lattice of numerical markers, which follow exactly Hamiltonian trajectories, to represent the operator d/dt in moving (i.e., Lagrangian) coordinates. H

The generalized equal width (GEW) equation is solved numerically by the Petrov-Galerkin method using a linear hat function as the test function and a quadratic B-spline function as the trial function. Product approximation has been used in this method. A linear stability analysis of the scheme shows