Some sharp restriction inequalities on the sphere
Abstract
In this paper we find the sharp forms and characterize the complex-valued extremizers of the adjoint Fourier restriction inequalities on the sphere \|f σ\|Lp(Rd) \|f\|Lq(Sd-1,σ) in the cases (d,p,q) = (d,2k, q) with d,k ∈ N and q∈ R+ \∞\ satisfying: (a) k = 2, q ≥ 2 and 3 ≤ d≤ 7; (b) k = 2, q ≥ 4 and d ≥ 8; (c) k ≥ 3, q ≥ 2k and d ≥ 2. We also prove a sharp multilinear weighted restriction inequality, with weight related to the k-fold convolution of the surface measure.
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