Finite-time blow-up in the three-dimensional fully parabolic attraction-dominated attraction-repulsion chemotaxis system

Abstract

We show that the attraction-repulsion chemotaxis system equation* cases ut = u - ∇·(u∇ v1) + ∇·(u∇ v2)\\ ∂t v1 = v1 - β v1 + α u \\ ∂t v2 = v2 - δ v2 + γ u, cases equation* posed with homogeneous Neumann boundary conditions in bounded domains =BR ⊂ R3, R>0, admits radially symmetric solutions which blow-up in finite time if it is attraction-dominated in the sense that α-γ>0.