Extremizers for Fourier restriction on hyperboloids

Abstract

The L2 Lp adjoint Fourier restriction inequality on the d-dimensional hyperboloid Hd ⊂ Rd+1 holds provided 6 ≤ p < ∞, if d=1, and 2(d+2)/d ≤ p≤ 2(d+1)/(d-1), if d≥2. Quilodr\'an recently found the values of the optimal constants in the endpoint cases (d,p)∈\(2,4),(2,6),(3,4)\ and showed that the inequality does not have extremizers in these cases. In this paper we answer two questions posed by Quilodr\'an, namely: (i) we find the explicit value of the optimal constant in the endpoint case (d,p) = (1,6) (the remaining endpoint for which p is an even integer) and show that there are no extremizers in this case; and (ii) we establish the existence of extremizers in all non-endpoint cases in dimensions d ∈ \1,2\. This completes the qualitative description of this problem in low dimensions.