Absence of critical mass phenomena in one-dimensional critical quasilinear Keller-Segel systems

Abstract

We consider the Neumann initial boundary value problem associated to the chemotaxis system alignprob:abstract cases ut = ((u+1)m-1 ux - u(u+1)m vx)x & in (0, 1) × (0, ∞), \\ vt = vxx - v + u, &in (0, 1) × (0, ∞), cases align where m ∈ R is a given parameter. The relation between diffusion and taxis sensitivity is critical since the ratio u(u+1)m/(u+1)m-1 grows like u2/n for large u with n = ((0, 1)) = 1. Nonetheless, we show that there is no critical mass phenomenon if m -1; that is, in that case all solutions emanating from suitably regular initial data are globally bounded. For certain parabolic-elliptic simplifications of prob:abstract, we obtain the same conclusion for all m ∈ (-∞, -1] (0, ∞) and even for all m ∈ R if the initial datum is additionally assumed to be monotone. This stands in contrast to critical mass phenomena known to occur for critical quasilinear Keller-Segel systems considered in higher-dimensional domains. Accordingly, we make use of several special features of the one-dimensional setting such as the boundedness of the energy functional from below, the embedding W1, n L∞, and the fact that the mass accumulation function solves a spatially non-degenerate parabolic equation.