Sharp Nonuniqueness in the Transport Equation with Sobolev Velocity Field

TL;DR

This paper demonstrates the sharpness of the known uniqueness range for solutions to the transport equation with Sobolev velocity fields by constructing a counterexample when the conditions are not met.

Contribution

It introduces a novel flow mechanism that combines features of convex integration and self-similarity to show nonuniqueness beyond the established range.

Findings

Counterexample to uniqueness when /p + (d-1)/(dr) > 1

Sharpness of the known uniqueness criterion

New flow mechanism blending convex integration and self-similarity

Abstract

Given a divergence-free vector field ${\bf u} \in L^\infty_t W^{1,p}_x(\mathbb R^d)$ and a nonnegative initial datum $\rho_0 \in L^r$, the celebrated DiPerna--Lions theory established the uniqueness of the weak solution in the class of $L^\infty_t L^r_x$ densities for $\frac{1}{p} + \frac{1}{r} \leq 1$. This range was later improved in [BCDL21] to $\frac{1}{p} + \frac{d-1}{dr} \leq 1$. We prove that this range is sharp by providing a counterexample to uniqueness when $\frac{1}{p} + \frac{d-1}{dr} > 1$. To this end, we introduce a novel flow mechanism. It is not based on convex integration, which has provided a non-optimal result in this context, nor on purely self-similar techniques, but shares features of both, such as a local (discrete) self similar nature and an intermittent space-frequency localization.