Global classical small-data solutions for a three-dimensional chemotaxis Navier-Stokes system involving matrix-valued sensitivities

Abstract

The coupled chemotaxis fluid system equation \ arrayllc nt= n-∇·(n S(x,n,c)·∇ c)-u·∇ n, &(x,t)∈ × (0,T), ct= c-nc-u·∇ c, &(x,t)∈× (0,T), ut= u-(u·∇ )u+∇ P+n∇, ∇· u=0, &(x,t)∈× (0,T), ∇ c·=(∇ n-nS(x,n,c)·∇ c)·=0, \;\; u=0,&(x,t)∈ ∂× (0,T), n(x,0)=n0(x), c(x,0)=c0(x), u(x,0)=u0(x) & x∈, array . equation where S∈ (C2(× [0,∞)2))N× N, is considered in a bounded domain ⊂RN, N∈\2,3\, with smooth boundary. We show that it has global classical solutions if the initial data satisfy certain smallness conditions and give decay properties of these solutions.