Some remarks on Fourier restriction estimates

Abstract

We provide Lp Lq refinements on some Fourier restriction estimates obtained using polynomial partitioning. Let S⊂ R3 be a compact C∞ surface with strictly positive second fundamental form. We derive sharp Lp(S) Lq(R3) estimates for the associated Fourier extension operator for q> 3.25 and q≥ 2p' from an estimate of Guth that was used to obtain L∞(S) Lq(R3) bounds for q>3.25. We present a slightly weaker result when S is the hyperbolic paraboloid in R3 based on the work of Cho and Lee. Finally, we give some refinements for the truncated paraboloid in higher dimensions.