Spikes and diffusion waves in one-dimensional model of chemotaxis

Abstract

We consider the one-dimensional initial value problem for the viscous transport equation with nonlocal velocity ut = uxx - (u (K u))x with a given kernel K'∈ L1(). We show the existence of global-in-time nonnegative solutions and we study their large time asymptotics. Depending on K', we obtain either linear diffusion waves ( i.e.~the fundamental solution of the heat equation) or nonlinear diffusion waves (the fundamental solution of the viscous Burgers equation) in asymptotic expansions of solutions as t∞. Moreover, for certain aggregation kernels, we show a concentration of solution on an initial time interval, which resemble a phenomenon of the spike creation, typical in chemotaxis models.