Blow-up phenomena for a chemotaxis system with flux limitation

Abstract

In this paper we consider nonnegative solutions of the following parabolic-elliptic cross-diffusion system equation* \ arrayl aligned &ut = u - ∇(u f(|∇ v|2 )∇ v), \\[6pt] &0= v -μ + u , ∫v =0, \ \ μ := 1 || ∫ u dx, \\[6pt] &u(x,0)= u0(x), aligned array . equation* in × (0,∞), with a ball in RN, N≥ 3 under homogeneous Neumann boundary conditions and f() = (1+ )-α, 0<α < N-22(N-1), which describes gradient-dependent limitation of cross diffusion fluxes. Under conditions on f and initial data, we prove that a solution which blows up in finite time in L∞-norm, blows up also in Lp-norm for some p>1. Moreover, a lower bound of blow-up time is derived. .2truecm AMS Subject Classification Primary: 35B44; Secondary: 35Q92, 92C17. .2truecm Key Words: finite-time blow-up; chemotaxis.