A Numerical Study of Traveling Wave Fronts for a Reaction-Diffusion-Advection Model

This paper concerns with the traveling wave solutions of a nonlinear reaction-diffusion-advection model for describing the spatiotemporal evolution of bacterial colony pattern. We use different methods for computing the traveling wave fronts of the model equations. One of the methods involves the traveling wave equations. Numerical solutions of these equations as an initial-value problem lead to accurate computations of the wave profiles and speeds. The second method is to construct the time-dependent solutions by solving an initial-moving boundary-value problem for the PDE system, showing an approximation for such wave fronts, in particular, the minimum speed traveling wave.