Binomial Squares in Pure Cubic Number Fields
classification
🧮 math.NT
keywords
cubicnumberomegapurefieldsformgroupsquares
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Let K = Q(\omega) with \omega^3 = m be a pure cubic number field. We show that the elements\alpha \in K^\times whose squares have the form a - \omega form a group isomorphic to the group of rational points on the elliptic curve E_m: y^2= x^3 - m. We also show how to apply these results to the construction of unramified quadratic extensions of pure cubic number fields.
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