Maximal averages and non-transversality

Abstract

We investigate the Lp mapping properties of maximal functions associated with analytic hypersurfaces in Rd, with a particular emphasis on the role of transversality. Around points that are not transversal, we show that the associated maximal function is bounded on Lp( Rd) for all p>2, regardless of the decay of the Fourier transform of surface measures. In contrast, away from non-transversal points, we prove that Lp bounds for the maximal operator imply that the Fourier transform of the surface measure decays at rate 1/q for q>p. Combining these two regimes, we demonstrate that the conjecture of Stein and Iosevich-Sawyer on maximal functions could be re-formulated, in the analytic setting, by restricting attention to transversal points. Moreover, our result completely settles the refined form of the conjecture for certain cases.