Convergence to traveling waves in the Fisher-Kolmogorov equation with a non-Lipschitzian reaction term

Abstract

We consider the semi linear Fisher-Kolmogorov-Petrovski-Piscounov equation for the advance of an advantageous gene in biology. Its non-smooth reaction function f(u) allows for the introduction of travelling waves with a new profile. We study existence, uniqueness, and long-time asymptotic behavior of the solutions u(x,t), (x,t)∈ R× R+. We prove also the existence and uniqueness (up to a spatial shift) of a travelling wave U. Our main result is the uniform convergence (for x∈ R) of every solution u(x,t) of the Cauchy problem to a single traveling wave U(x-ct + ζ) as t ∞. The speed c and the travelling wave U are determined uniquely by f, whereas the shift ζ is determined by the initial data.