Unit-generated orders of real quadratic fields I. Class number bounds
Abstract
Unit-generated orders of a quadratic field are orders of the form O = Z[], where is a unit in the quadratic field. If the order O is a maximal order of a real quadratic field, then the quadratic number field is necessarily of a restricted form, being of narrow Richaud--Degert type. However, every real quadratic field contains infinitely many distinct unit-generated orders. They are parametrized as O = On having quadratic discriminants (O) = n+ = n2 - 4 (for n ≥ 3) and (O) = n- = n2 + 4 (for n ≥ 1). We show the (wide or narrow) class numbers of unit-generated orders satisfy | Cl(O)| 12|(O)| as |(O)| ∞, using a result of L.-K. Hua. We deduce that there are finitely many unit-generated quadratic orders of class number one and finitely many unit-generated quadratic orders whose class group is 2-torsion. We classify all unit-generated real quadratic orders having class number one. We provide numerical lists of quadratic unit-generated orders whose class groups are 2-torsion for ≤ 1010, for both wide and narrow class groups. These lists are conjecturally complete for all .
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