A method for solving the functional equation with variable delay

In this paper, the variational iteration method is applied to neutral functional-differential equations with proportional delays. Illustrative examples are given to show the efficiency of the method. We also compare the performance of the method with that of a particular Runge-Kutta method and a one

The advection±dispersion equation with spatially variable coecients does not have an exact analytical solution and is therefore solved numerically. However, solutions obtained with several of the traditional ®nite dierence or ®nite element techniques typically exhibit spurious oscillation or numeric

We shall obtain sufficient conditions for the uniform stability and the global asymptotic stability of the linear difference equation with variable delay where {Pn} is a sequence of nonnegative real numbers, {kn} is a sequence of nonnegative integers, and there exists a nonnegative integer k such t

In this paper, we give sufficient conditions under which every solution of the nonlinear difference equation with variable delay tends to zero as n --+ c<). Here, {Pn} is a nonnegative sequence, f : R --+ R is a continuous function with xf(x) > 0 if x ~ 0, and g : N --~ Z is nondecreasing and satis