Abstract
We study rational numbers with purely periodic R\'enyi $\beta$-expansions. For bases $\beta$ satisfying $\beta^2=a\beta+b$ with $b$ dividing $a$, we give a necessary and sufficient condition for $\gamma(\beta)=1$, i.e., that all rational numbers $p/q\in[0,1)$ with $\gcd(q,b)=1$ have a purely periodic $\beta$-expansion. A simple algorithm for determining the value of $\gamma(\beta)$ for all quadratic Pisot numbers $\beta$ is described.
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