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We prove that any sequence of vanishing viscosity Leray--Hopf solutions to the periodic two-dimensional incompressible Navier--Stokes equations does not display anomalous dissipation if the initial vorticity is a measure with positive singular part. A key step in the proof is the use of the Delort--Majda concentration-compactness argument to exclude formation of atoms in the vorticity measure, which in particular implies that the limiting velocity is an admissible weak solution to Euler. Moreover, our proof reveals that the amount of energy dissipation can be bounded by the vorticity contained in an arbitrarily small disk.
Rosa et al. (Thu,) studied this question.
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