Bilinear identities involving the k-plane transform and Fourier extension operators
Abstract
We prove certain L2(Rn) bilinear estimates for Fourier extension operators associated to spheres and hyperboloids under the action of the k-plane transform. As the estimates are L2-based, they follow from bilinear identities: in particular, these are the analogues of a known identity for paraboloids, and may be seen as higher-dimensional versions of the classical L2(R2)-bilinear identity for Fourier extension operators associated to curves in R2.
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