Long gaps in sieved sets

Abstract

For each prime p, let Ip ⊂ Z/pZ denote a collection of residue classes modulo p such that the cardinalities |Ip| are bounded and about 1 on average. We show that for sufficiently large x, the sifted set \ n ∈ Z: n p ∈ Ip for all p ≤ x\ contains gaps of size at least x ( x)δ where δ>0 depends only on the density of primes for which Ip . This improves on the "trivial" bound of x. As a consequence, for any non-constant polynomial f:Z Z with positive leading coefficient, the set \ n ≤ X: f(n) composite\ contains an interval of consecutive integers of length ( X) ( X)δ for sufficiently large X, where δ>0 depends only on the degree of f.