The inviscid inflow-outflow problem via analyticity

Abstract

We consider the incompressible Euler equation on an analytic domain with nonhomogeneous boundary condition u· n = u · n on ∂ , where u is a given divergence-free analytic vector field. We establish local well-posedness for u in analytic spaces without any compatibility conditions in all space dimensions. We also prove global well-posedness in the 2D case if u decays in time sufficiently fast.

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