Primes in arithmetic progressions on average I
Primes in arithmetic progressions on average I
Let E_x(q,a) be the error term when counting primes in arithmetic progressions and let M(Q)=sum_{q<Q}phi(q)\sum_{a=1}^qE_x(q,a)^3. We show that M(Q)<<Q^3(x/Q)^{4/3} for large Q close to x (in the usual BDH sense) thereby showing that sign changes in the error give power saving cancellation past the expected root(x/q) heuristic.