Euclidean Algorithms for Ideal Classes in Biquadratic fields: A Genus-Theoretic Perspective

Abstract

We study Euclidean ideal classes in real biquadratic fields and obtain unconditional existence results via genus theory. Lenstra showed (assuming the Generalized Riemann Hypothesis) that a number field with unit rank at least one admits a Euclidean ideal precisely when its class group is cyclic; subsequent work has aimed to remove the GRH hypothesis in special families. Focusing on real biquadratic fields K=Q(d1,d2) with 2 d1d2, we prove that if the class group ClK is cyclic and the Hilbert class field H(K) is abelian over Q, then K contains a Euclidean ideal class (unconditionally). We also analyse the distribution of genus numbers in a natural family of biquadratic fields and, using these statistics, show that the set of biquadratic fields admitting a Euclidean ideal has density zero.

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