Does fluid interaction affect regularity in the three-dimensional Keller-Segel system with saturated sensitivity?

Abstract

A class of Keller-Segel-Stokes systems generalizing the prototype \[ \ arrayrcl nt + u·∇ n &=& n - ∇ · (n(n+1)-α∇ c), ct + u·∇ c &=& c-c+n, ut +∇ P &=& u + n ∇ φ + f(x,t), ∇· u =0, array . () \] is considered in a bounded domain ⊂ R3, where φ and f are given sufficiently smooth functions such that f is bounded in × (0,∞). It is shown that under the condition that \[ α>13, \] for all sufficiently regular initial data a corresponding Neumann-Neumann-Dirichlet initial-boundary value problem possesses a global bounded classical solution. This extends previous findings asserting a similar conclusion only under the stronger assumption α>12. In view of known results on the existence of exploding solutions when α<13, this indicates that with regard to the occurrence of blow-up the criticality of the decay rate 13, as previously found for the fluid-free counterpart of (), remains essentially unaffected by fluid interaction of the type considered here.