Incompressible Euler equations in 3D bounded domains in a critical space
Abstract
We consider the 3D incompressible Euler equations in bounded domains with smooth boundary ∂. Based on the paper by Iwabuchi, Matsuyama and Taniguchi (2019), we define the Besov space Bsp, q(A) by means of the Stokes operator A with the Neumann boundary condition on ∂, and prove unique local existence theorem of strong solution for the initial data in the critical Besov space B522, 1(A). Our proof relies on the method of vanishing viscosity. The commutator estimate plays an essential role for derivation of energy bounds which hold uniformly with respect to viscosity constants.
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