A weighted formulation of refined decoupling and inequalities of Mizohata-Takeuchi-type for the moment curve
Abstract
Let be a compact patch of a well-curved Cn+1 curve in Rn with induced Lebesgue measure d λ, and let g g \, dλ be the Fourier extension operator for . Then we have, for arbitrary non-negative weights w, equation* ∫BR |g \, dλ|2w ≤ Cn,a Ra S (∫S w)∫ |g|2 \, d λ equation* for any a> n-32 + 2n - 2n2(n+1), where the is over all 1-neighbourhoods S of hyperplanes whose normals are parallel to the tangent at some point of . This represents partial progress on the Mizohata-Takeuchi conjecture for curves in dimensions n ≥ 3, improving upon the exponent a=n-1 which can be obtained as a consequence of the Agmon-H\"ormander trace inequality. Our main tool in establishing this inequality will be a weighted formulation of refined decoupling for well-curved curves. We also discuss the sharpness of the exponents we obtain in this and in auxiliary results, and further explore this in the context of axiomatic decoupling for curves.
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