Infinite time blow-up of many solutions to a general quasilinear parabolic-elliptic Keller-Segel system

Abstract

We consider a parabolic-elliptic chemotaxis system generalizing \[ casessplit & ut=∇·((u+1)m-1∇ u)-∇ ·(u(u+1)σ-1∇ v)\\ & 0 = v - v + u splitcases \] in bounded smooth domains ⊂ RN, N 3, and with homogeneous Neumann boundary conditions. We show that *) solutions are global and bounded if σ<m-N-2N *) solutions are global if σ 0 *) close to given radially symmetric functions there are many initial data producing unbounded solutions if σ >m-N-2N. In particular, if σ 0 and σ > m-N-2N, there are many initial data evolving into solutions that blow up after infinite time.