On a nonlinear convection-diffusion equation

to diffusion, a convection term is present. Our overall aim is to look at the effect of convection on the existence and What is the long-time effect of adding convention to a discretised reaction-diffusion equation? For linear problems, it is well known stability of the true and spurious fixed point

For the 1+1-dimensional nonlinear di usion equations with x-dependent convection and source terms ut = (D(u)ux)x + Q(x; u)ux + P(x; u), we obtain conditions under which the equations admit the second-order generalized conditional symmetries Á(x; u) = uxx + H (u)u 2 x + G(x; u)ux + F(x; u) and the ÿ

A simple nonlinear scheme for iterative solution of nonlinear convection-diffusion equation is described. The scheme is tested by solutions of three nonlinear steadystate model equations and linear nonstationary transport equation. The feature of the scheme is transition from a second-order accuracy