Convergence Rates for the Stationary and Non-stationary Navier-Stokes Equations over Non-Lipschitz Boundaries

Abstract

In this paper, we consider the higher-order convergence rates for the 2D stationary and non-stationary Navier-Stokes Equations over highly oscillating periodic bumpy John domains with C2 regularity in some neighborhood of the boundary point (0,0). For the stationary case and any γ∈ (0,1/2), using the variational equation satisfied by the solution and the correctors for the bumpy John domains obtained by Higaki, Prange and Zhuge higaki2021large,MR4619004 after correcting the values on the inflow/outflow boundaries (\0\\1\)×(0,1), we can obtain an O(2-γ) approximation in L2 for the velocity and an O(2-γ) convergence rates in L1 approximated by the so called Navier's wall laws, which generalized the results obtained by J\"ager and Mikeli\'c MR1813101. Moreover, for the non-stationary case, using the energy method, we can obtain an O(2-γ+(-Ct)) convergence rate for the velocity in Lx1.