The prime pairs are equidistributed among the coset lattice congruence classes

Abstract

In this paper we show that for some constant c>0 and for any A>0 there exist some x(A)>0 such that, If q≤ ( x)A then we have align z(x;Nq(a,b),q) &= (z)2φ(q)x + O(xec x) alignfor x≥ x(A) for some (z)>0. In particular for q≤ ( x)A for any A>0alignz(x;Nq(a,b),q) xD(z)2φ(q) alignfor some constant D(z)>0 and where φ(q)= \# \(a,b):(pi,pi+z)∈ Nq(a,b)\.