Wikipedia: Classification of finite simple groups

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A vast body of work, mostly published between around 1955 and 1983, classifies all of the finite simple groups. The classification shows all finite simple groups to be one of the following types:

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* an alternating groups of degree ≥ 5

* an alternating group of degree at least 5

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* an exceptional or twisted group of Lie type
* or one of 26 left over groups known as the sporadic groups

* an exceptional or twisted group of Lie type (including the Tits group)
* or one of 26 left-over groups known as the sporadic groups

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* McLaughlin? group McL?

* McLaughlin group McL

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The largest of the sporadic groups is the Monster group. It has 2⁴⁶.3²⁰.5⁹.7⁶.11².13³17.19.23.29.31.41.47.59.71=808,017,424,794,512,875,886,459,904,961,710,757,005,754,368,000,000,000 elements and plays a starring role in the [Monstrous Moonshine Conjectures]? of Conway and Morton which were subsequently proved by Borcherds.

The largest of the sporadic groups is the Monster group. It has 2⁴⁶.3²⁰.5⁹.7⁶.11².13³17.19.23.29.31.41.47.59.71 = 808,017,424,794,512,875,886,459,904,961,710,757,005,754,368,000,000,000 elements and plays a starring role in the [Monstrous Moonshine Conjectures]? of Conway and Morton which were subsequently proved by Borcherds.

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* [On Finite Simple Groups and their Classification]

*[On Finite Simple Groups and their Classification] (PDF file)

A vast body of work, mostly published between around 1955 and 1983, classifies all of the finite simple groups. The classification shows all finite simple groups to be one of the following types:

a cyclic group with prime order
an alternating group of degree at least 5
a classical linear group
an exceptional or twisted group of Lie type (including the Tits group)
or one of 26 left-over groups known as the sporadic groups

The Sporadic Groups

5 of the sporadic groups were discovered by Mathieu in the 1860's and the other 21 were found between 1965 and 1975. The full list is:

Mathieu groups M₁₁, M₁₂, M₂₂, M₂₃, M₂₄
Janko groups J₁, J₂, J₃, J₄
Conway groups Co₁,Co₂,Co₂
Fischer groups F₂₂,F₂₃,F₂₄
Higman-Sims group HS
McLaughlin group McL
Held group He
Rudvalis group Ru
Suzuki sporadic group Suz
O'Nan group ON
Harada-Norton group HN
Lyons group Ly
Thompson group Th
Baby Monster group
Monster group M

The Monster Group

The largest of the sporadic groups is the Monster group. It has 2⁴⁶.3²⁰.5⁹.7⁶.11².13³17.19.23.29.31.41.47.59.71 = 808,017,424,794,512,875,886,459,904,961,710,757,005,754,368,000,000,000 elements and plays a starring role in the [Monstrous Moonshine Conjectures]? of Conway and Morton which were subsequently proved by Borcherds.

External links:

[On Finite Simple Groups and their Classification] (PDF file)