Polynomial values modulo primes on average and sharpness of the larger sieve

Abstract

This paper is motivated by the following question in sieve theory. Given a subset X⊂ [N] and α∈ (0,1/2). Suppose that |X p|≤ (α+o(1))p for every prime p. How large can X be? On the one hand, we have the bound |X|αNα from Gallagher's larger sieve. On the other hand, we prove, assuming the truth of an inverse sieve conjecture, that the bound above can be improved (for example, to |X|αNO(α2014) for small α). The result follows from studying the average size of |X p| as p varies, when X=f(Z) [N] is the value set of a polynomial f(x)∈Z[x].