Regularity thresholds for anomalous dissipation and related phenomena in passive scalars

Abstract

We prove the absence of anomalous dissipation for passive scalars driven by some random autonomous divergence-free vector fields in Td. In dimension d=2 we just need continuity almost surely and a mild nondegeneracy condition on the randomness. In dimension d≥ 3 we assume a special geometric structure and almost sure H\"older regularity with a H\"older exponent bigger than 18. No regularity is assumed on the passive scalar except for boundedness in the initial data. The proof relies on dimension-theoretic arguments, as opposed to commutator estimates. A consequence of these results is that the same assumptions prevent (almost surely) many other expected properties of turbulent flows, such as anomalous regularization, the Yaglom-Obukhov-Corrsin law, and Richardson diffusion.

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