Long-term behaviour in a parabolic-elliptic chemotaxis-consumption model

Abstract

Global existence and boundedness of classical solutions of the chemotaxis--consumption system align* nt &= n - ∇ · (n ∇ c), \\ 0 &= c - nc, align* under no-flux boundary conditions for n and Robin-type boundary conditions \[ ∂ c = (γ-c) g \] for c (with γ>0 and C1+β(∂) g > 0 for some β∈(0,1)) are established in bounded domains ⊂RN, N 1. Under a smallness condition on γ, moreover, we show convergence to the stationary solution.