Mathematical analysis for the reaction-diffusion equations of Belousov-Zhabotinsky reaction

We can also confirm that the spreading speed coincides with the minimal wave speed of regular traveling waves of (1.1), which has been founded in many reaction-diffusion

Ruan; Existence and stability of traveling wave fronts in reaction advection diffusion equations with nonlocal delay, J. Ruan; Entire solutions in bistable reaction-diffusion

Nonlinear systems of the form 1.1 arise in many applications such as the discrete models of steady-state equations of reaction–diffusion equations see 1–6, the discrete analogue of

Bouziani, Rothe method for a mixed problem with an integral condition for the two-dimensional diffusion equation, Abstr.. Pao, Dynamics of reaction-diffusion equations with

In this work, we present an asymptotic analysis of a coupled sys- tem of two advection-diffusion-reaction equations with Danckwerts boundary conditions, which models the

The aim of this work is to prove the uniform boundedness and the existence of global solutions for Gierer-Meinhardt model of three substance described by reaction-diffusion

By using the Fourier transform, Green’s function and the weighted energy method, the authors in [24, 25] showed the global stability of critical traveling waves, which depends on

If D ( ρ ) ≥ 0, the existence of solutions to the initial-value problem for (1.1) is more or less classical [24]; however, the fine structure of traveling waves reveals a variety