Besov space approach to the Navier-Stokes equations with the Neumann boundary condition in bounded domains

Abstract

Based on the analysis by Iwabuchi-Matsuyama-Taniguchi (2019), we first introduce our framework of Besov spaces Bsp, q on the bounded domain ⊂ Rd with smooth boundary ∂ in terms of the Stokes operator A=A2 with the Neumann boundary condition on ∂ in L2σ(). Under some geometric assumption on , we establish Lp-Lq type estimates of the semi-group \e-tA\t 0 in Bsp, q and prove a local well-posedness of the Navier-Stokes equations with the initial data in B-1+ dp p, q for d < p < ∞ and 1 q ∞. Since d < p, we have Ld, ∞ ⊂ B-1+ dp p, ∞ so that our space for well-posedness is larger than any other previous one in bounded domains.

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