Ree group:Ree(3)

Definition
This group can be defined in two equivale ways:
 * 1) It is the member of family::Ree group with parameter value 3, i.e., the group $$\operatorname{Ree}(3)$$. Equivalently, it is the Ree group $$Ree(3^{1+2m})$$ where $$m = 0$$. It is the only Ree group that is not simple. The Ree groups $$\operatorname{Ree}(3^{1 + 2m})$$, $$m > 0$$, are all simple.
 * 2) It is the member of family::projective semilinear group of degree two over field:F8, i.e., it is the group $$P\Gamma L(2,8)$$.