Explicit count of integral ideals of an imaginary quadratic field
Abstract
We provide explicit bounds for the number of integral ideals of norms at most X is Q[d] when d <0 is a fundamendal discriminant with an error term of size O(X1/3). In particular, we prove that, when is the non-principal character modulo 3 and X1, we have Σn X(1)(n) = π33X +O*( 1.94\,X1/3), and that, when is the non-principal character modulo 4 and X1, we have Σn X(1)(n) = π 4X+ O*( 1.4\,X1/3).
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