Divergence-free drifts decrease concentration

Abstract

We show that bounded divergence-free vector fields u : [0,∞) × Rd d decrease the ''concentration'', quantified by the modulus of absolute continuity with respect to the Lebesgue measure, of solutions to the associated advection-diffusion equation when compared to solutions to the heat equation. In particular, for symmetric decreasing initial data, the solution to the advection-diffusion equation has (without a prefactor constant) larger variance, larger entropy, and smaller Lp norms for all p ∈ [1,∞] than the solution to the heat equation. We also note that the same is not true on Td.

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