Global existence and boundedness in a chemotaxis-Stokes system with slow p-Laplacian diffusion

Abstract

This paper deals with a boundary-value problem in three-dimensional smooth bounded convex domains for the coupled chemotaxis-Stokes system with slow p-Laplacian diffusion equation \ aligned &nt+u·∇ n=∇·(|∇ n|p-2∇ n)-∇·(n∇ c), &x∈,\ t>0,\ \ &ct+u·∇ c= c-nc,&x∈,\ t>0,\ \ &ut= u+∇ P+n∇φ ,&x∈,\ t>0,\ \ &∇· u=0, &x∈,\ t>0,\ \ aligned . equation where φ∈ W2,∞() is the gravitational potential. It is proved that global bounded weak solutions exist whenever p>2311 and the initial data (n0,c0,u0) are sufficiently regular satisfying n0≥ 0 and c0≥ 0.