Tits group

In the area of modern algebra known as group theory, the Tits group ²F₄(2)′, named for Jacques Tits (French: [tits]), is a finite simple group of order

It is sometimes considered a 27th sporadic group.

The Ree groups ²F₄(2²ⁿ⁺¹) were constructed by Ree (1961), who showed that they are simple if n ≥ 1. The first member of this series ²F₄(2) is not simple. It was studied by Jacques Tits (1964) who showed that it is almost simple, its derived subgroup ²F₄(2)′ of index 2 being a new simple group, now called the Tits group. The group ²F₄(2) is a group of Lie type and has a BN pair, but the Tits group itself does not have a BN pair. Because the Tits group is not strictly a group of Lie type, it is sometimes regarded as a 27th sporadic group.

The Schur multiplier of the Tits group is trivial and its outer automorphism group has order 2, with the full automorphism group being the group ²F₄(2).

The Tits group occurs as a maximal subgroup of the Fischer group Fi₂₂. The groups ²F₄(2) also occurs as a maximal subgroup of the Rudvalis group, as the point stabilizer of the rank-3 permutation action on 4060 = 1 + 1755 + 2304 points.

...
Wikipedia