Boundedness in a three-dimensional chemotaxis-haptotaxis model

Abstract

This paper studies the chemotaxis-haptotaxis system equation \ arrayllc ut= u-∇·(u∇ v)-∇·(u∇ w)+μ u(1-u-w), &(x,t)∈ × (0,T),\\ vt= v-v+u, &(x,t)∈× (0,T),\\ wt=-vw,&(x,t)∈ × (0,T) array .() equation under Neumann boundary conditions. Here ⊂R3 is a bounded domain with smooth boundary and the parameters ,,μ>0. We prove that for nonnegative and suitably smooth initial data (u0,v0,w0), if /μ is sufficiently small, () possesses a global classical solution which is bounded in ×(0,∞). We underline that the result fully parallels the corresponding parabolic-elliptic-ODE system.