Two new functional inequalities and their application to the eventual smoothness of solutions to a chemotaxis-Navier-Stokes system with rotational flux

Abstract

We prove two new functional inequalities of the forms\[ ∫G ( - ) ≤ 1a∫G (\;\; ) + a4β0 \ ∫G \∫G|∇ |2 \] and \[ ∫G (\;\; ) ≤ 1β0\ ∫G \∫G |∇ ()|2 \] for any finitely connected, bounded C2-domain G ⊂eq R2, a constant β0 > 0, any a > 0 and sufficiently regular functions , . We then illustrate their usefulness by proving long time stabilization and eventual smoothness properties for certain generalized solutions to the chemotaxis-Navier-Stokes system\[ \\;\; aligned nt + u · ∇ n &\;\;=\;\; n - ∇ · (nS(x,n,c) ∇ c), \\ ct + u· ∇ c &\;\;=\;\; c - n f(c), \\ ut + (u· ∇) u &\;\;=\;\; u + ∇ P + n ∇ φ, \;\;\;\;\;\; ∇ · u = 0, aligned . \] on a smooth, bounded, convex domain ⊂eq R2 with no-flux boundary conditions for n and c as well as a Dirichlet boundary condition for u. We further allow for a general chemotactic sensitivity S attaining values in R2× 2 as opposed to a scalar one.

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