A convex integration scheme for the continuity equation past the Sobolev embedding threshold

Abstract

We introduce a convex integration scheme for the continuity equation in the context of the Di Perna-Lions theory that allows to build incompressible vector fields in CtW1,px and nonunique solutions in Ct Lqx for any p,q with 1p + 1q > 1 + 1d- δ for some δ>0. This improves the previous bound, corresponding to δ=0, or equivalently q' > p*, obtained with convex integration so far, and critical for those schemes in view of the Sobolev embedding that guarantees that solutions are distributional in the opposite range.

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