Well-posedness and vanishing rotational limit for the rotating incompressible Navier-Stokes equations in hybird Besov space

Abstract

We establish the well-posedness of the 3D rotating incompressible Navier-Stokes equations with critical initial data u0,Ω∈ X0,q,pΩ for p<5, where X0,q,pΩ is defined by the norm equation* aligned &\|u0,Ω\|X0,q,pΩ:= Ω3- 6q\|u0,Ω\|Bq,∞-7+15qΩ +\|u0,Ω\|Bp,∞-1+3phΩ. aligned equation* This extends the previous results by Chen, Miao, and Zhang (CMZ2013). The main ingredients are a new global-in-time dissipative-dispersive estimate for the Stokes--Coriolis semigroup and corresponding bilinear estimates. Furthermore, we establish the vanishing rotational limit for the 3D rotating Navier-Stokes equations as Ω→ 0+.