On critical spaces for the Navier-Stokes equations
Abstract
The abstract theory of critical spaces developed in [22] and [20] is applied to the Navier-Stokes equations in bounded domains with Navier boundary conditions as well as no-slip conditions. Our approach unifies, simplifies and extends existing work in the Lp-Lq setting, considerably. As an essential step, it is shown that the strong and weak Stokes operators with Navier conditions admit an H∞-calculus with H∞-angle 0, and the real and complex interpolation spaces of these operators are identified.
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