Non-uniqueness of parabolic solutions for advection-diffusion equation

Abstract

We present a novel example of a divergence-free velocity field b ∈ L∞ ((0,1); Lp (T2)) for p<2 arbitrary but fixed which leads to non-unique solutions of advection-diffusion in the class L∞t,x L2t H1x while satisfying the local energy inequality. This result complements the known uniqueness result of bounded solutions for divergence-free and L2t,x integrable velocity fields. Additionally, we also prove the necessity of time integrability of the velocity field for the uniqueness result. More precisely, we construct another divergence-free velocity field b ∈ Lp ((0,1); L∞ (T2)), for p< 2 fixed, but arbitrary, with non-unique aforementioned solutions. Our contribution closes the gap between the regime of uniqueness and non-uniqueness in this context. Previously, it was shown with the convex integration technique that for d≥ 3 divergence-free velocity fields b ∈ L∞((0,1);Lp (Td)) with p < 2dd+2 could lead to non-unique solutions in the space L∞t L2dd-2x L2t H1x. Our proof is based on a stochastic Lagrangian approach and does not rely on convex integration.

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