Boundedness and finite-time blow-up in a quasilinear parabolic-elliptic-elliptic attraction-repulsion chemotaxis system

Abstract

This paper deals with the quasilinear attraction-repulsion chemotaxis system align* cases ut=∇· ((u+1)m-1∇ u - u(u+1)p-2∇ v + u(u+1)q-2∇ w) +f(u), \\[1.05mm] 0= v+α u-β v, \\[1.05mm] 0= w+γ u-δ w cases align* in a bounded domain ⊂ Rn (n ∈ N) with smooth boundary ∂, where m, p, q ∈ R, , , α, β, γ, δ>0 are constants. Moreover, it is supposed that the function f satisfies f(u)0 in the study of boundedness, whereas, when considering blow-up, it is assumed that m>0 and f is a function of logistic type such as f(u)=λ u-μ u with λ 0, μ>0 and >1 sufficiently close to~1, in the radially symmetric setting. In the case that =0 and f(u) 0, global existence and boundedness have been proved under the condition p<m+2n. Also, in the case that m=1, p=q=2 and f is a function of logistic type, finite-time blow-up has been established by assuming α-γ>0. This paper classifies boundedness and blow-up into the cases p<q and p>q without any condition for the sign of α-γ and the case p=q with α-γ<0 or α-γ>0.