A sharp trilinear inequality related to Fourier restriction on the circle
Abstract
In this paper we prove a sharp trilinear inequality which is motivated by a program to obtain the sharp form of the L2 - L6 Tomas-Stein adjoint restriction inequality on the circle. Our method uses intricate estimates for integrals of sixfold products of Bessel functions developed in a companion paper. We also establish that constants are local extremizers of the Tomas-Stein adjoint restriction inequality as well as of another inequality appearing in the program.
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