On the ternary Goldbach problem with primes in independent arithmetic progressions

Abstract

We show that for every fixed A>0 and θ>0 there is a =(A,θ)>0 with the following property. Let n be odd and sufficiently large, and let Q1=Q2:=n( n)- and Q3:=( n)θ. Then for all q3≤ Q3, all reduced residues a3 mod q3, almost all q2≤ Q2, all admissible residues a2 mod q2, almost all q1≤ Q1 and all admissible residues a1 mod q1, there exists a representation n=p1+p2+p3 with primes pi ai (qi), i=1,2,3.