Speed selection and stability of wavefronts for delayed monostable reaction-diffusion equations

Abstract

We study the asymptotic stability of traveling fronts and front's velocity selection problem for the time-delayed monostable equation (*) ut(t,x) = uxx(t,x) - u(t,x) + g(u(t-h,x)),\ x ∈ R,\ t >0, considered with Lipschitz continuous reaction term g: R+ R+. We are also assuming that g is C1,α-smooth in some neighbourhood of the equilibria 0 and >0 to (*). In difference with the previous works, we do not impose any convexity or subtangency condition on the graph of g so that equation (*) can possess pushed traveling fronts. Our first main result says that the non-critical wavefronts of (*) with monotone g are globally nonlinearly stable. In the special and easier case when the Lipschitz constant for g coincides with g'(0), we present a series of results concerning the exponential [asymptotic] stability of non-critical [respectively, critical] fronts for the monostable model (*). As an application, we present a criterion of the absolute global stability of non-critical wavefronts to the diffusive Nicholson's blowflies equation.