Boundedness in a quasilinear fully parabolic Keller-Segel system with logistic source

Abstract

This paper deals with the Neumann boundary value problem for the system ut=∇·(D(u)∇ u)-∇·(S(u)∇ v)+f(u) , x∈,\ t>0 vt= v-v+u, x∈,\ t>0 in a smooth bounded domain ⊂Rn (n≥1), where the functions D(u) and S(u) are supposed to be smooth satisfying D(u)≥ Mu-α and S(u)≤ Muβ with M>0, α∈R and β∈R for all u≥1, and the logistic source f(u) is smooth fulfilling f(0)≥0 as well as f(u)≤ a-μ uγ with a≥0, μ>0 and γ≥1 for all u≥0. It is shown that if α+2β<γ-1+2n, for 1≤γ<2 and α+2β<γ-1+4n+2, for γ≥2, then for sufficiently smooth initial data the problem possesses a unique global classical solution which is uniformly bounded.