On Gaussian primes in sparse sets

Abstract

We show that there exists some δ > 0 such that, for any set of integers B with B[1,Y] Y1-δ for all Y 1, there are infinitely many primes of the form a2+b2 with b∈ B. We prove a quasi-explicit formula for the number of primes of the form a2+b2 ≤ X with b ∈ B for any |B|=X1/2-δ with δ < 1/10 and B ⊂eq [η X1/2,(1-η)X1/2] Z, in terms of zeros of Hecke L-functions on Q(i). We obtain the expected asymptotic formula for the number of such primes provided that the set B does not have a large subset which consists of multiples of a fixed large integer. In particular, we get an asymptotic formula if B is a sparse subset of primes. For an arbitrary B we obtain a lower bound for the number of primes with a weaker range for δ, by bounding the contribution from potential exceptional characters.