Uniform Lp estimates for solutions to the inhomogeneous 2D Navier-Stokes equations and application to a chemotaxis-fluid system with local sensing

Abstract

The chemotaxis-Navier-Stokes system equation*1 \ arrayrcl nt+u·∇ n &=& (n c-α ), \\[1mm] ct+ u·∇ c &=& c -nc,\\[1mm] ut + (u·∇) u &=& u+∇ P + n∇, ∇· u=0, array . equation* modelling the behavior of aerobic bacteria in a fluid drop, is considered in a smoothly bounded domain ⊂ R2. For all α > 0 and all sufficiently regular , we construct global classical solutions and thereby extend recent results for the fluid-free analogue to the system coupled to a Navier-Stokes system. As a crucial new challenge, our analysis requires a priori estimates for u at a point in the proof when knowledge about n is essentially limited to the observation that the mass is conserved. To overcome this problem, we also prove new uniform-in-time Lp estimates for solutions to the inhomogeneous Navier-Stokes equations merely depending on the space-time L2 norm of the force term raised to an arbitrary small power.