Some sharp inequalities of Mizohata--Takeuchi-type

Abstract

Let be a strictly convex, compact patch of a C2 hypersurface in Rn, with non-vanishing Gaussian curvature and surface measure dσ induced by the Lebesgue measure in Rn. The Mizohata--Takeuchi conjecture states that equation* ∫ |gdσ|2w ≤ C \|Xw\|∞ ∫ |g|2 equation* for all g∈ L2() and all weights w:Rn→ [0,+∞), where X denotes the X-ray transform. As partial progress towards the conjecture, we show, as a straightforward consequence of recently-established decoupling inequalities, that for every ε>0, there exists a positive constant Cε, which depends only on and ε, such that for all R ≥ 1 and all weights w:Rn→ [0,+∞) we have equation* ∫BR |gdσ|2w ≤ Cε Rε T (∫ T wn+12)2n+1∫ |g|2, equation* where T ranges over the family of all tubes in Rn of dimensions R1/2 × … × R1/2 × R. From this we deduce the Mizohata--Takeuchi conjecture with an Rn-1n+1-loss; i.e., that equation* ∫BR |gdσ|2w ≤ Cε Rn-1n+1+ ε\|Xw\|∞∫ |g|2 equation* for any ball BR of radius R and any ε>0. The power (n-1)/(n+1) here cannot be replaced by anything smaller unless properties of gdσ beyond 'decoupling axioms' are exploited. We also provide estimates which improve this inequality under various conditions on the weight, and discuss some new cases where the conjecture holds.