Finite-time blow-up in the higher-dimensional parabolic-parabolic Keller-Segel system

Abstract

We study the Neumann initial-boundary value problem for the fully parabolic Keller-Segel system ut= u - ∇ · (u∇ v), x∈, \ t>0, [1mm] vt= v-v+u, x∈, \ t>0, where is a ball in Rn with n 3. It is proved that for any prescribed m>0 there exist radially symmetric positive initial data (u0,v0) ∈ C0() × W1,∞() with ∫ u0=m such that the corresponding solution blows up in finite time. Moreover, by providing an essentially explicit blow-up criterion it is shown that within the space of all radial functions, the set of such blow-up enforcing initial data indeed is large in an appropriate sense; in particular, this set is dense with respect to the topology of Lp() × W1,2() for any p ∈ (1,2nn+2).