Units from square-roots of rational numbers

Abstract

Let D,Q be natural numbers, (D,Q)=1, such that D/Q>1 and D/Q is not a square. Let q be the smallest divisor of Q such that Q|\, q2. We show that the units >1 of the ring Z[Dq2/Q] are connected with certain convergents of D/Q. Among these units, the units of Z[DQ] play a special role, inasmuch as they correspond to the convergents of D/Q that occur just before the end of each period. We also show that the last-mentioned units allow reading the (periodic) continued fraction expansion of certain quadratic irrationals from the (finite) continued fraction expansion of certain rational numbers.

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