Global dynamics for the generalized chemotaxis-Navier-Stokes system in R3

Abstract

We consider the chemotaxis-Navier-Stokes system with generalized fluid dissipation in R3: eqnarray* cases ∂t n+u· ∇ n= n- ∇ · ((c)n ∇ c),\\ ∂t c+u · ∇ c= c-nf(c),\\ ∂t u +u · ∇ u+∇ P=-(-)α u-n∇ φ,\\ ∇ · u=0, cases eqnarray* which describes the motion of swimming bacteria or bacillus subtilis suspended to water flows. First, we prove some blow-up criteria of strong solutions to the Cauchy problem, including the Prodi-Serrin type criterion (α>34) and the Beirao da Veiga type criterion (α>12). Then, we verify the global existence and uniqueness of strong solutions for arbitrarily large initial fluid velocity and bacteria density for α≥ 54. Furthermore, in the scenario of 34<α<54, we establish uniform regularity estimates and optimal time-decay rates of global solutions if the L2-norm of initial data is small. To our knowledge, this is the first result concerning the global existence and large-time behavior of strong solutions for the chemotaxis-Navier-Stokes equations with possibly large oscillations.

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