Global maximizers for adjoint Fourier restriction inequalities on low dimensional spheres

Abstract

We prove that constant functions are the unique real-valued maximizers for all L2-L2n adjoint Fourier restriction inequalities on the unit sphere Sd-1⊂Rd, d∈\3,4,5,6,7\, where n≥ 3 is an integer. The proof uses tools from probability theory, Lie theory, functional analysis, and the theory of special functions. It also relies on general solutions of the underlying Euler-Lagrange equation being smooth, a fact of independent interest which we establish in a companion paper. We further show that complex-valued maximizers coincide with nonnegative maximizers multiplied by the character ei·ω, for some , thereby extending previous work of Christ & Shao to arbitrary dimensions d≥ 2 and general even exponents.