Norm Growth, Non-uniqueness, and Anomalous Dissipation in Passive Scalars

Abstract

We construct a divergence-free velocity field u:[0,T] × T2 R2 satisfying u ∈ C∞([0,T];Cα(T2)) ∀ α ∈ [0,1) such that the corresponding drift-diffusion equation exhibits anomalous dissipation for every smooth initial data. We also show that, given any α0 < 1, the flow can be modified such that it is uniformly bounded only in Cα0(T2) and the regularity of solutions satisfy sharp (time-integrated) bounds predicted by the Obukhov-Corrsin theory. The proof is based on a general principle implying H1 growth for all solutions to the transport equation, which may be of independent interest.