Asymptotic behavior of a quasilinear Keller--Segel system with signal-suppressed motility

Abstract

This paper is concerned with the density-suppressed motility model: ut= (umvα) +β uf(w), vt=D v-v+u, wt= w-uf(w) in a smoothly bounded convex domain ⊂ R2, where m>1, α>0, β>0 and D>0 are parameters, the response function f satisfies f∈ C1([0,∞)), f(0)=0, f(w)>0 in (0,∞). This system describes the density-suppressed motility of Eeshcrichia coli cells in process of spatio-temporal pattern formation via so-called self-trapping mechanisms. Based on the duality argument, it is shown that for suitable large D the problem admits at least one global weak solution (u,v,w) which will asymptotically converge to the spatially uniform equilibrium (u0+β w0,u0+β w0,0) with u0=1||∫u(x,0)dx and w0=1||∫w(x,0)dx in L∞().