Fourier extension estimates on a strip in R2

Abstract

Given a smooth curve with nonzero curvature ⊂ R2, let E denote the associated Fourier extension operator. For both general compact curves and the parabola, we characterize the pairs (p,q)∈ [1,∞]2 for which the estimates \|Ef\|Lq()≤ C\|f\|Lp() and (R(|Ef|q))1q≤ C\|f\|Lp() hold, where is a strip in R2 and R denotes the Radon transform. This work continues the study of mass concentration of x Ef(x) near lines in R2, initiated by Bennett and Nakamura and later extended by Bennett, Nakamura, and the second author, where expressions of the form (R(|Ef|2))12 were studied.