Global existence, boundedness and asymptotic behavior to a logistic chemotaxis model with density-signal governed sensitivity and signal absorption

Abstract

In present paper, we consider a chemotaxis consumption system with density-signal governed sensitivity and logistic source: ut= u-∇·(S(u)v∇ v)+ru-μ u2, vt= v-uv in a smooth bounded domain ⊂Rn (n2), where parameters r,μ>0 and density governed sensitivity fulfills S(u) u(u+1)β-1 for all u0 with β∈ R. It is proved that for any r,μ>0, there exists a global classical solution if β<1 and n2. Moreover, the global boundedness and the asymptotic behavior of the classical solution are determined for the case β∈[0,1) in two dimensional setting, that is, the global solution (u,v) is uniformly bounded in time and (u,v,|∇ v|v)(rμ,0,0)~in~L∞()~as~t→∞, provided μ sufficiently large.