Nonlinear convective diffusion: A hyperfiltration application

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

## Communicated by M. Fila In this paper, we establish the blow-up theorems of Fujita type for a class of homogeneous Neumann exterior problems of quasilinear convection-diffusion equations. The critical Fujita exponents are determined and it is shown that the exponents belong to the blow-up case

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

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