Non-uniqueness of the transport equation at high spacial integrability

Abstract

In this paper, we show the non-uniqueness of the weak solution in the class ∈ LstLpx for the transport equation driven by a divergence-free vector field u∈ LstW1,qx Lts'Lxp' happens in the range 1/p+1/q>1-p-14(p+1)p with some s>1, as long as 1 s<∞, p>1. As a corollary, L∞ in time of the density is critical in some sense for the uniqueness of weak solution. Our proof is based on the convex integration method developed in [Modena and Sattig, 2020, Ann. Inst. H. Poincar\'e C Anal. Non Lin\'eaire], [Cheskidov and Luo, 2021, Ann. PDE].