Stability of sharp Fourier restriction to spheres

Abstract

In dimensions d ∈ \3,4,5,6,7\, we prove that the constant functions on the unit sphere Sd-1⊂ Rd maximize the weighted adjoint Fourier restriction inequality | ∫Rd |fσ(x)|4\,(1 + g(x))\,d x|1/4 ≤ C \, \|f\|L2(Sd-1)\,, where σ is the surface measure on Sd-1, for a suitable class of bounded perturbations g:Rd C. In such cases we also fully classify the complex-valued maximizers of the inequality. In the unperturbed setting (g = 0), this was established by Foschi (d=3) and by the first and third authors (d ∈ \4,5,6,7\) in 2015. Our methods also yield a new sharp adjoint restriction inequality on S7⊂ R8.