On the number of monogenizations of a quartic order
Abstract
We show that an order in a quartic field has fewer than 3000 essentially different generators as a Z-algebra (and fewer than 200 if the discriminant of the order is sufficiently large). This significantly improves the previously best known bound of 272. Analogously, we show that an order in a quartic field is isomorphic to the invariant order of at most 10 classes of integral binary quartic forms (and at most 7 if the discriminant is sufficiently large). This significantly improves the previously best known bound of 280.
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