On the global solvability of the generalised Navier-Stokes system in critical Besov spaces
Abstract
This paper is devoted to the global solvability of the Navier-Stokes system with fractional Laplacian (-)α in Rn for n≥2, where the convective term has the form (|u|m-1u)·∇ u for m≥1. By establishing the estimates for the difference |u1|m-1u1-|u2|m-1u2 in homogeneous Besov spaces, and employing the maximal regularity property of (-)α in Lorentz spaces, we prove global existence and uniqueness of the strong solution of the Navier-Stokes in critical Besov spaces for both m=1 and m>1
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