An optimal result for global existence and boundedness in a three-dimensional Keller-Segel-Stokes system with nonlinear diffusion

Abstract

This paper investigates the following quasilinear Keller-Segel-Navier-Stokes system \ arrayl nt+u·∇ n= nm-∇·(n∇ c), x∈ , t>0, \\ ct+u·∇ c= c-c+n, x∈ , t>0,\\ ut+∇ P= u+n∇ φ, x∈ , t>0,\\ ∇· u=0, x∈ , t>0 array. under homogeneous boundary conditions of Neumann type for n and c, and of Dirichlet type for u in a three-dimensional bounded domains ⊂eq R3 with smooth boundary, where φ∈ W1,∞(),m>0. It is proved that if m>43, then for any sufficiently regular nonnegative initial data there exists at least one global boundedness solution for system (KSF), which in view of the known results for the fluid-free system mentioned below (see Introduction) is an optimal restriction on m.