Refined temporal asymptotics near blow-up points in the planar Keller-Segel system

Abstract

For the Keller-Segel system \[ \\, aligned ut &= u - ∇ · ( u ∇ v ), \\ vt &= v - v + u aligned . \] posed in a planar domain with Neumann boundary conditions, the existence of classical solutions blowing up at some finite time T has long been established. In fact, it has been shown that for every blow-up point x the quantity ∫BR(x) u(·,t )(u(·, t)) is unbounded as t T for all R > 0 even though the global mass of u is always conserved. The present manuscript provides some quantitative information on the behavior of such localized L L expressions by asserting the existence of δ0=δ0()>0 such that any solution to the Neumann problem for () blowing up at time T∈ (0,∞) satisfies \[ t T 1TT-t∫BR(x) u(·, t)(u(·, t)) δ0 \] for all R > 0 at each blow-up point x. This confirms a certain universality property of the blow-up mechanism seen in the particular examples of radial collapsing solutions constructed in the seminal work [16], especially also beyond the realm of symmetry; apart from that, along with a consequence of () on the corresponding asymptotics of similarly localized Lp norms of u for p∈ (1,∞], this provides some extension of a known result on non-degeneracy of blow-up points that has concentrated on the choice p=∞ here.