On the small denominator problem for generalized Minkowski--Funk transforms

Abstract

Rubin's generalized Minkowski--Funk transforms Mtα on the sphere Sn give rise, for irrational radii t=(βπ), to a small denominator problem governed by the asymptotic behavior of their spectral multipliers. We show that for Lebesgue-almost every β the corresponding two-sine small divisor inequality has infinitely many solutions, and deduce that (Mtα)-1 is not bounded from Hs++1(Sn) to Hs(Sn) in the non-critical case ≠ 0,1. In the critical cases ∈\0,1\ we prove Rubin's Conjectures 4.4 and 4.7 on the failure of endpoint Sobolev regularity for the inverse transforms.