A sharp k-plane Strichartz inequality for the Schr\"odinger equation

Abstract

We prove that \|X(|u|2)\|L3t,≤ C\|f\|L2(R2)2, where u(x,t) is the solution to the linear time-dependent Schr\"odinger equation on R2 with initial datum f, and X is the (spatial) X-ray transform on R2. In particular, we identify the best constant C and show that a datum f is an extremiser if and only if it is a gaussian. We also establish bounds of this type in higher dimensions d, where the X-ray transform is replaced by the k-plane transform for any 1≤ k≤ d-1. In the process we obtain sharp L2(μ) bounds on Fourier extension operators associated with certain high-dimensional spheres, involving measures μ supported on natural "co-k-planarity" sets.