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What are the orders of maximal abelian subgroups of the simple groups F_4(q)$F_4(q)$ and C_4(q)$C_4(q)$, where F_4(q)$F_4(q)$ is an exceptional group and C_4(q)$C_4(q)$ is a symplectic group?
What are the orders of maximal abelian subgroups of the simple groups F_4(q) and C_4(q), where F_4(q) is an exceptional group and C_4(q) is a symplectic group?
What are the orders of maximal abelian subgroups of the simple groups $F_4(q)$ and $C_4(q)$, where $F_4(q)$ is an exceptional group and $C_4(q)$ is a symplectic group?
What are the orders of maximal abelian subgroups of the simple groups F_4(q) and C_4(q), where F_4(q) is an exceptional group and C_4(q) is a symplectic group?
