Global weak solutions for the three-dimensional chemotaxis-Navier-Stokes system with slow p-Laplacian diffusion

Abstract

This paper investigates an incompressible chemotaxis-Navier-Stokes system with slow p-Laplacian diffusion eqnarray \arraylll nt+u·∇ n=∇·(|∇ n|p-2∇ n)-∇·(n(c)∇ c),& x∈,\ t>0, ct+u·∇ c= c-nf(c),& x∈,\ t>0, ut+(u·∇) u= u+∇ P+n∇,& x∈,\ t>0, ∇· u=0,& x∈,\ t>0 array. eqnarray under homogeneous boundary conditions of Neumann type for n and c, and of Dirichlet type for u in a bounded convex domain ⊂ R3 with smooth boundary. Here, ∈ W1,∞(), 0<∈ C2([0,∞)) and 0≤ f∈ C1([0,∞)) with f(0)=0. It is proved that if p>3215 and under appropriate structural assumptions on f and , for all sufficiently smooth initial data (n0,c0,u0) the model possesses at least one global weak solution.