Abstract
In this note we establish a new discreteness criterion for a non-elementary group $G$ in $\mathit{SL}(2, \mathbb{C})$. Namely, $G$ is discrete if all the two-generator subgroups are discrete, where one generator is a non-trivial element $f$ in $G$, and the other is in the conjugacy class of $f$.
Citation
Shihai Yang. Tiehong Zhao. "Conjugacy class and discreteness in $\mathit{SL}(2, \mathbb{C})$." Osaka J. Math. 53 (4) 1047 - 1053, October 2016.
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