Blow-up phenomena in a parabolic-elliptic-elliptic attraction-repulsion chemotaxis system with superlinear logistic degradation

Abstract

This paper is concerned with the attraction-repulsion chemotaxis system with superlinear logistic degradation, align* cases ut = u - ∇·(u ∇ v) + ∇· (u ∇ w) + λ u - μ uk, &x ∈ ,\ t>0,\\[1.05mm] 0= v + α u - β v, &x ∈ ,\ t>0,\\[1.05mm] 0= w + γ u - δ w, &x ∈ ,\ t>0, cases align* under homogeneous Neumann boundary conditions, in a ball ⊂ Rn (n 3), with constant parameters λ ∈ R, k>1, μ, , , α, β, γ, δ>0. Blow-up phenomena in the system have been well investigated in the case λ=μ=0, whereas the attraction-repulsion chemotaxis system with logistic degradation has been not studied. Under the condition that k>1 is close to 1, this paper ensures a solution which blows up in L∞-norm and Lσ-norm with some σ>1 for some nonnegative initial data. Moreover, a lower bound of blow-up time is derived.