Restriction estimates for hyperboloids in higher dimensions via bilinear estimates

Abstract

Let H be a (d-1)-dimensonal hyperbolic paraboloid in Rd and let Ef be the Fourier extension operator associated to H, with f supported in Bd-1(0,2). We prove that \|Ef\|Lp (B(0,R)) ≤ CεRε\|f\|Lp for all p ≥ 2(d+2)d whenever d2 ≥ m + 1, where m is the minimum between the number of positive and negative principal curvatures of H. Bilinear restriction estimates for H proved by S. Lee and Vargas play an important role in our argument.