In the mathematical classification of finite simple groups, a thin group is a finite group such that for every odd prime number p, the Sylow p-subgroups of the 2-local subgroups are cyclic. Informally, these are the groups that resemble rank 1 groups of Lie type over a finite field of characteristic 2.
defined thin groups and classified those of characteristic 2 type in which all 2-local subgroups are solvable. The thin simple groups were classified by . The list of finite simple thin groups consists of:
- The projective special linear groups PSL<sub>2</sub>(q)
- The projective special linear groups PSL<sub>3</sub>(p) for p = 1 + 2<sup>a</sup> or p = 1 + 2<sup>a</sup>3, and PSL<sub>3</sub>(4)
- The projective special unitary groups PSU<sub>3</sub>(p) for p = 1 - 2<sup>a</sup> or p = 1 - 2<sup>a</sup>3, and PSU<sub>3</sub>(2<sup>n</sup>)
- The Suzuki groups Sz(2<sup>n</sup>)
- The Tits group <sup>2</sup>F<sub>4</sub>(2)'
- The Steinberg group <sup>3</sup>D<sub>4</sub>(2)
- The Mathieu group M<sub>11</sub>
- The Janko group J1
See also
References