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Continuum theory, point-set topology, spaces with algebraic structure, foundations, dimension theory, local and global properties.
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Rank of a generall linear group over a finite field [closed]
What is the rank (minimal number of group generators) of the group $GL(n,F)$, when $F$ is a finite field of odd order? I found that $SL(n,F)$ is $2$, but I can't find this information.
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Rank of a generall linear group over a finite field
Sorry for the silly question... I haven't searched the right way.
Here is the answer: book1