An Upper Bound on the Least InertPrime in a Real Quadratic

@inproceedings{FieldAndrew2007AnUB,
  title={An Upper Bound on the Least InertPrime in a Real Quadratic},
  author={FieldAndrew and Granville and Richard A. Mollin and H. Chardon and WilliamsOctober},
  year={2007}
}
  • FieldAndrew, Granville, +2 authors WilliamsOctober
  • Published 2007
It is shown by a combination of analytic and computational techniques that for any positive fundamental discriminant D > 3705, there is always at least one prime p < p D=2 such that the Kronecker symbol (D=p) = ?1.