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YCor
YCor
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General Linearlinear group analogs

The Wikipedia pages for $E_6$ and $E_7$ list three series of groups notated as each of $E_6(q)$, $^2E_6(q)$, and $E_7(q)$:

  • The simple form, analogous to $PSL_n(q)$$\operatorname{PSL}_n(q)$
  • The adjoint form, analogous to $PGL_n(q)$$\operatorname{PGL}_n(q)$
  • The universal form, analogous to $SL_n(q)$$\operatorname{SL}_n(q)$

Is there a fourth series analogous to $GL_n(q)$$\operatorname{GL}_n(q)$?

General Linear group analogs

The Wikipedia pages for $E_6$ and $E_7$ list three series of groups notated as each of $E_6(q)$, $^2E_6(q)$, and $E_7(q)$:

  • The simple form, analogous to $PSL_n(q)$
  • The adjoint form, analogous to $PGL_n(q)$
  • The universal form, analogous to $SL_n(q)$

Is there a fourth series analogous to $GL_n(q)$?

General linear group analogs

The Wikipedia pages for $E_6$ and $E_7$ list three series of groups notated as each of $E_6(q)$, $^2E_6(q)$, and $E_7(q)$:

  • The simple form, analogous to $\operatorname{PSL}_n(q)$
  • The adjoint form, analogous to $\operatorname{PGL}_n(q)$
  • The universal form, analogous to $\operatorname{SL}_n(q)$

Is there a fourth series analogous to $\operatorname{GL}_n(q)$?

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Daniel Sebald
Daniel Sebald
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General Linear group analogs

The Wikipedia pages for $E_6$ and $E_7$ list three series of groups notated as each of $E_6(q)$, $^2E_6(q)$, and $E_7(q)$:

  • The simple form, analogous to $PSL_n(q)$
  • The adjoint form, analogous to $PGL_n(q)$
  • The universal form, analogous to $SL_n(q)$

Is there a fourth series analogous to $GL_n(q)$?