Stability vs. instability of singular steady states in the parabolic-elliptic Keller-Segel system on Rn

Abstract

The Cauchy problem in Rn is considered for eqnarray* \ arrayl ut = u - ∇ · (u∇ v),\\ 0 = v + u. array . eqnarray* For each n 10, a statement on stability and attractiveness of the singular steady state given by \[ u(x):=2(n-2)|x|2, x∈ Rn\0\, \] is derived within classes of nonnegative radial solutions emanating from initial data less concentrated than u. In particular, for any such n it is shown that infinite-time blow-up occurs for all radial initial data which are less concentrated than u and satisfy \[ u0(x) 2(n-2)|x|2 - C|x|2+θ for all x∈ Rn B1(0) \] with some C>0 and some θ>n-2+(n-2)(n-10)2. This is complemented by a result which, in the case when 3 n 9, asserts instability of u as well as the existence of a bounded absorbing set for all radial trajectories initially less concentrated than u. In particular, previous knowledge on stability properties of u, as having been gained for n 11 in [24], is thereby extended to any dimension n 3.