A critical blow-up exponent for flux limitation in a Keller-Segel system

Abstract

The parabolic-elliptic cross-diffusion system \[ \ arrayl ut = u - ∇ · (uf(|∇ v|2) ∇ v ), \\[1mm] 0 = v - μ + u, ∫ v=0, μ:=1|| ∫ u dx, array . \] is considered along with homogeneous Neumann-type boundary conditions in a smoothly bounded domain ⊂ Rn, n 1, where f generalizes the prototype given by \[ f() = (1+)-α, 0, for all 0, \] with α∈ R. In this framework, the main results assert that if n 2, is a ball and \[ α<n-22(n-1), \] then throughout a considerably large set of radially symmetric initial data, an associated initial value problem admits solutions blowing up in finite time with respect to the L∞ norm of their first components. This is complemented by a second statement which ensures that in general and not necessarily symmetric settings, if either n=1 and α∈ R is arbitrary, or n 2 and α>n-22(n-1), then any explosion is ruled out in the sense that for arbitrary nonnegative and continuous initial data, a global bounded classical solution exists.