Power loss for the Mizohata-Takeuchi conjecture on Ck convex hypersurfaces

Abstract

We find a family of compact Ck hypersurfaces where the local Mizohata-Takeuchi Conjecture fails with a power loss of Rα for any α<n-1n-1+k. Moreover, this family is dense in the Ck topology, and so the local Mizohata-Takeuchi conjecture fails for many convex hypersurfaces. In particular, the local Mizohata-Takeuchi Conjecture fails with a power loss of Rα for any α<n-1n+1 for many C2 convex hypersurfaces. This power matches the best known upper bound in a paper by Tony Carbery, Marina Iliopoulou and Hong Wang up to the endpoint. For the proof, our weight is positive definite as in the first author's recent (R)-loss counterexample, and our construction is based on a projection of a higher rank lattice. As a by-product, we also construct compact convex C2 hypersurfaces whose rescaling contains many lattice points in any dimension.

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