Absence of dead-core formations in chemotaxis systems with degenerate diffusion

Abstract

In this paper we consider a chemotaxis system with signal consumption and degenerate diffusion of the form align* arrayr@l@l &ut=∇·(D(u)∇ u-uS(u)∇ v)+f(u,v),\\ &vt= v- uv,\\ array. align* in a bounded domain ⊂RN with smooth boundary subjected to no-flux and homogeneous Neumann boundary conditions. Herein, the diffusion coefficient D∈ C0([0,∞)) C2((0,∞)) is assumed to satisfy D(0)=0, D(s)>0 on (0,∞), D'(s)≥ 0 on (0,∞) and that there are s0>0, p>1 and CD>0 such that s D'(s)≤ CD D(s) CD sp-1≤ D(s) s∈[0,s0]. The sensitivity function S∈ C2([0,∞)) and the source term f∈ C1([0,∞)×[0,∞)) are supposed to be nonnegative. We show that for all suitably regular initial data (u0,v0) satisfying u0≥ δ0>0 and v0 0 there is a time-local classical solution and - despite the degeneracy at 0 - the solution satisfies an extensibility criterion of the form either Tmax=∞,t Tmax\|u(·,t)\|L∞()=∞. Moreover, as a by-product of our analysis, we prove that a classical solution on ×(0,T) obeying \|u(·,t)\|L∞()≤ Mu for all t∈(0,T) and emanating from initial data (u0,v0) as specified above remains strictly positive throughout ×(0,T), i.e. one can find δu=δu(T,δ0, Mu,\|v0\|W1,∞())>0 such that u(x,t)≥δu all (x,t)∈×(0,T). Together, the results indicate that the formation of a dead-core in these chemotaxis systems with a degenerate diffusion are impossible before the blow-up time.