Coupled reaction-diffusion equations with degenerate diffusivity: wavefront analysis

Abstract

We investigate traveling wave solutions for a nonlinear system of two coupled reaction-diffusion equations characterized by double degenerate diffusivity: \[nt= -f(n,b), bt=[g(n)h(b)bx]x+f(n,b).\] These systems mainly appear in modeling spatial-temporal patterns during bacterial growth. Central to our study is the diffusion term g(n)h(b), which degenerates at n=0 and b=0; and the reaction term f(n,b), which is positive, except for n=0 or b=0. Specifically, the existence of traveling wave solutions composed by a couple of strictly monotone functions for every wave speed in a closed half-line is proved, and some threshold speed estimates are given. Moreover, the regularity of the traveling wave solutions is discussed in connection with the wave speed.

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