On the dynamics of a discrete reaction-diffusion system

In this paper we study the numerical behavior of a reaction-diffusion system with a control source point. The main goal consists in estimating the position of the source point that maximizes a given objective function. To reduce the number of variables involved in the optimization algorithm, we firs

A finite volume method for the convection-diffusion-reaction equation is presented, which is a model equation in combustion theory. This method is combined with an exponential scheme for the computation of the fluxes. We prove that the numerical fluxes are second-order accurate, uniformly in the loc

We consider a system of second-order ordinary differential equations describing Ž . steady state for a three-component chemical system with diffusion in the case when one of the reactions is fast. We discuss the existence of solutions and the existence, uniqueness, and characterization of a limit as

Numerical computations for a one (space) dimensional reaction-diffusion system, exhibiting alternate regimes of periodic-aperiodic behaviour, are reported in this study. The bifurcation analysis reveals the following routes to chaos: (a) stable steady state -+ limit cycle -+ doubly periodic orbit --