Notes on restriction theory in the primes

Abstract

TO BE PUBLISHED BY ISRAEL JOURNAL OF MATHEMATICS. We study the mean Σx∈X |Σp Nup e(xp)| when covers the full range [2,∞) and X⊂R/Z is a well-spaced set, providing a smooth transition from the case =2 to the case >2 and improving on the results of J.~Bourgain and of B.~Green and T.~Tao. A uniform Hardy-Littlewood property for the set of primes is established as well as a sharp upper bound for Σx∈X |Σp Nup e(xp)| when X is small. These results are extended to primes in any interval in a last section, provided the primes are numerous enough therein.