The least prime number represented by a binary quadratic form

Abstract

Let D<0 be a fundamental discriminant and h(D) be the class number of Q(D). Let R(X,D) be the number of classes of the binary quadratic forms of discriminant D which represent a prime number in the interval [X,2X]. Moreover, assume that πD(X) is the number of primes, which split in Q(D) with norm in the interval [X,2X]. We prove that (πD(X)π(X))2 R(X,D)h(D)(1+h(D)π(X)), where π(X) is the number of primes in the interval [X,2X] and the implicit constant in is independent of D and X.