Rudin Inequality, Chang Theorem, primes and squares

Abstract

We prove that the set of large values of the trigonometric polynomial over a subset of density of the primes has some additive structure, similarly to what happens for subsets of densities in Z/NZ but in a weaker form. To do so, we prove large sieve inequalities for dissociate sets X of circle points and functions f whose support~S is finite and respectively in an interval, in the set of primes or in the set of squares. Set T(f,x)=Σnf(n)(2iπ nx). These inequalities are of the shape Σx∈X|T(f,x)|2 |S|\|f\|22(8R/|S|) where R is respectively N, N/ N and N. The implied constants depend on the spacement between sumsets of~X.