Energy dissipation near the outflow boundary in the vanishing viscosity limit

Abstract

We consider the incompressible Navier-Stokes and Euler equations in a bounded domain with non-characteristic boundary condition, and study the energy dissipation near the outflow boundary in the zero-viscosity limit. We show that in a general setting, the energy dissipation rate is proportional to U V 2, where U is the strength of the suction and V is the tangential component of the difference between the Euler and the Navier-Stokes solutions on the outflow boundary. Moreover, we show that the enstrophy within a layer of order / U is comparable with the total enstrophy. The rate of enstrophy production near the boundary is inversely proportional to .

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