Norm-Euclidean Galois fields and the Generalized Riemann Hypothesis
Abstract
Assuming the Generalized Riemann Hypothesis (GRH), we show that the norm-Euclidean Galois cubic fields are exactly those with discriminant =72,92,132,192,312,372,432,612,672,1032,1092,1272,1572. A large part of the proof is in establishing the following more general result: Let K be a Galois number field of odd prime degree and conductor f. Assume the GRH for ζK(s). If 38(-1)2( f)6 f<f, then K is not norm-Euclidean.
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