Dimension-free Fourier restriction inequalities

Abstract

Let RSd-1(p q) denote the best constant for the Lp(Rd) Lq(Sd-1) Fourier restriction inequality to the unit sphere Sd-1, and let RSd-1 (p q;rad) denote the corresponding constant for radial functions. We investigate the asymptotic behavior of the operator norms RSd-1(p q) and RSd-1 (p q;rad) as the dimension d tends to infinity. We further establish a dimension-free endpoint Stein-Tomas inequality for radial functions, together with the corresponding estimate for general functions which we prove with an O(d1/2) dependence. Our methods rely on a uniform two-sided refinement of Stempak's asymptotic Lp estimate of Bessel functions.

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