Nonlinear control of diffusion-convection-reaction processes

In this paper, the series pattern solutions of the nonlinear reaction-diffusion-convection initial value problems are obtained by using the homotopy analysis method (HAM). A complete description of this method is derived and the convergence of this method is shown. Finally, two test examples are giv

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

Nonnegative solutions of a general reaction-diffusion model with convection are known to be unique if the reaction, convection, and diffusion terms are all Lipschitz continuous with respect to their dependence on the solution variable. However, it is also known that such a Lipschitz condition is not

In this paper, the authors propose a numerical method to compute the solution of the Cauchy problem: w t -(w m w x ) x = w p , the initial condition is a nonnegative function with compact support, m > 0, p m + 1. The problem is split into two parts: a hyperbolic term solved by using the Hopf and Lax