A higher-dimensional Siegel-Walfisz theorem

Abstract

The Green-Tao-Ziegler theorem provides asymptotics for the number of prime tuples of the form (1(n),…,t(n)) when n ranges among the integer vectors of a convex body K⊂ [-N,N]d and =(1,…,t) is a system of affine-linear forms whose linear coefficients remain bounded (in terms of N). In the t=1 case, the Siegel-Walfisz theorem shows that the asymptotic still holds when the coefficients vary like a power of N. We prove a higher-dimensional (i.e. t>1) version of this fact. We provide natural examples where our theorem goes beyond the one of Green and Tao, such as the count of arithmetic of progressions of step N times a prime in the primes up to N. We also apply our theorem to the determination of asymptotics for the number of linear patterns in a dense subset of the primes, namely the primes p for which p-1 is squarefree. To the best of our knowledge, this is the first such result in dense subsets of primes save for congruence classes.