Uniform Fourier restriction for convex curves

Abstract

We extend the estimates for maximal Fourier restriction operators proved by M\"uller, Ricci, and Wright in MR3960255 and Ramos in MR4055940 to the case of arbitrary convex curves in the plane, with constants uniform in the curve. The improvement over M\"uller, Ricci, and Wright and Ramos is given by the removal of the C2 regularity condition on the curve. This requires the choice of an appropriate measure for each curve, that is suggested by an affine invariant construction of Oberlin in MR1960918. As corollaries, we obtain a uniform Fourier restriction theorem for arbitrary convex curves, and a result on the Lebesgue points of the Fourier transform on the curve.