Non-conservative H 12- weak solutions of the incompressible 3D Euler equations

Abstract

For any positive regularity parameter β < 12, we construct non-conservative weak solutions of the 3D incompressible Euler equations which lie in Hβ uniformly in time. In particular, we construct solutions which have an L2-based regularity index strictly larger than 13, thus deviating from the H13-regularity corresponding to the Kolmogorov-Obhukov 53 power spectrum in the inertial range.

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