Extreme temporal intermittency in the linear Sobolev transport: almost smooth nonunique solutions

Abstract

In this paper, we revisit the notion of temporal intermittency to obtain sharp nonuniqueness results for linear transport equations. We construct divergence-free vector fields with sharp Sobolev regularity L1t W1,p for all p<∞ in space dimensions d≥ 2 whose transport equations admit nonunique weak solutions belonging to LptCk for all p<∞ and k∈ N. In particular, our result shows that the time-integrability assumption in the uniqueness of the DiPerna-Lions theory is sharp. The same result also holds for transport-diffusion equations with diffusion operators of arbitrarily large order in any dimensions d ≥ 2.