Smoothness of solutions of a convolution equation of restricted-type on the sphere

Abstract

Let Sd-1 denote the unit sphere in Euclidean space Rd, d≥ 2, equipped with surface measure σd-1. An instance of our main result concerns the regularity of solutions of the convolution equation \[ a·(fσd-1) (q-1)Sd-1=f, a.e. on Sd-1, \] where a∈ C∞(Sd-1), q≥ 2(d+1)/(d-1) is an integer, and the only a priori assumption is f∈ L2(Sd-1). We prove that any such solution belongs to the class C∞(Sd-1). In particular, we show that all critical points associated to the sharp form of the corresponding adjoint Fourier restriction inequality on Sd-1 are C∞-smooth. This extends previous work of Christ & Shao to arbitrary dimensions and general even exponents, and plays a key role in a companion paper.