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Let G=PSU_3(q)$G=PSU_3(q)$ and q=q'^n$q=p^n$, where n$n$ is odd. Can we conclude that PSU_3(q')$PSU_3(p)$ is a subgroup of G$G$?
Let G=PSU_3(q) and q=q'^n, where n is odd. Can we conclude that PSU_3(q') is a subgroup of G?
Let $G=PSU_3(q)$ and $q=p^n$, where $n$ is odd. Can we conclude that $PSU_3(p)$ is a subgroup of $G$?
