Can a chemotaxis-consumption system recover from a measure-type aggregation state in arbitrary dimension?

Abstract

We consider the chemotaxis-consumption system \[ \ aligned ut &= u - ∇ · (u∇ v) \\ vt &= v - uv aligned . \] in a smooth bounded domain ⊂eq Rn, n ≥ 2, with parameter > 0 and Neumann boundary conditions. It is well known that, for sufficiently smooth nonnegative initial data and under a smallness condition for the initial state of v, solutions of the above system never blow up and are even globally bounded. Going in a sense a step further in this paper, we ask the question whether the system can even recover from an initial state that already resembles measure-type blowup. To answer this, we show that, given an arbitrarily large positive Radon measure u0 with u0() > 0 as the initial data for the first equation and a nonnegative L∞() function v0 with \[ 0 < \|v0\|L∞() < 23n \] as initial data for the second equation, it is still possible to construct a global classic solution to the above system.