Non-uniqueness of forced active scalar equations with even drift operators

Abstract

We consider forced active scalar equations with even and homogeneous degree 0 drift operator on Td. Inspired by the non-uniqueness construction for dyadic fluid models, by implementing a sum-difference convex integration scheme we obtain non-unique weak solutions for the active scalar equation in space Ct0Cxα with α<12d+1. We note that in 1D, the regularity α<13 is sharp as the energy identity is satisfied for solutions in Cα with α>13. Without external forcing, Isett and Vicol constructed non-unique weak solutions for such active scalar equations with spatial regularity Cxα for α<14d+1.

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