Sharp non-uniqueness for the Boussinesq equation with fractional dissipation

Abstract

This paper focuses on the d-dimensional (d≥2) Boussinesq equation with fractional dissipation (-)α on the torus. We show that the uniqueness property breaks down within the function space LptL∞x for any p<2α2α-1 when 1≤α<d+12 and the function space L2α2α-1tLqx for any q<∞ when 1<α<d+12. Moreover, the weak solutions we construct are smooth outside a set of singular times with Hausdorff dimension arbitrarily small. This result is sharp, as weak-strong uniqueness holds in the space L2α2α-1TL∞x.

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