Explicit smoothed prime ideals theorems under GRH
Abstract
Let K be the Chebyshev function of a number field K. Let (1) K(x):=∫0x K(t)\,d t and (2) K(x):=2∫0x(1) K(t)\,d t. We prove under GRH explicit inequalities for the differences |(1) K(x) - x22| and |(2) K(x) - x33|. We deduce an efficient algorithm for the computation of the residue of the Dedekind zeta function and a bound on small-norm prime ideals.
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