Explicit bounds for primes in arithmetic progressions

Abstract

We derive explicit upper bounds for various functions counting primes in arithmetic progressions. By way of example, if q and a are integers with (a,q)=1 and 3 ≤ q ≤ 105, and θ(x;q,a) denotes the sum of the logarithms of the primes p a q with p ≤ x, we show that | θ (x; q, a) - xφ (q) | < 1160 x x, for all x 8 · 109 (with sharper constants obtained for individual such moduli q). We establish inequalities of the same shape for the other standard prime-counting functions π(x;q,a) and (x;q,a), as well as inequalities for the nth prime congruent to a q when q1200. For moduli q>105, we find even stronger explicit inequalities, but only for much larger values of x. Along the way, we also derive an improved explicit lower bound for L(1,) for quadratic characters , and an improved explicit upper bound for exceptional zeros.