On Lenstra's criterion for norm-Euclideanity of number fields and properties of Dedekind zeta-functions
Abstract
In 1977, Lenstra provided a criterion for norm-Euclideanity of number fields and noted that this criterion becomes ineffective for number fields of large enough degrees under the Generalised Riemann Hypothesis (GRH) for the Dedekind zeta-functions. In the first part of the paper we make Lenstra's observation explicit by proving that, under GRH, the criterion becomes ineffective for all number fields of degree n ≥ 62238. This follows from combining the criterion assumption with the explicit lower bound for the discriminant of K under GRH, and the (trivial) upper bound for the minimal proper ideal norm in OK. Unconditionally, the lower bound for the discriminant is too weak to lead to such a contradiction. However, we show that GRH can be replaced by another condition on the Dedekind zeta functions ζK, a conjectural lower bound for ζK at a point to the right of s = 1. Combined with Zimmert's approach, this condition implies a different type of upper bound for the minimal proper ideal norm and again contradicts Lenstra's criterion for all n large enough. The advantage of the new potential condition on ζK is that it can be computationally checked for number fields of not too large degrees.
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