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A matrix group is a subgroup of $\GL_n(R)$ for some commutative ring $R$.

A given abstract group may have more than one presentation as a matrix group over different rings $R$.

The value $z_k$ in a given matrix represents a primitive element of the finite field $\F_{p^k}$ for some prime $p$.

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  • Last edited by Jennifer Paulhus on 2023-12-12 13:44:10
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