Co2

E169184

Co2 is one of the three sporadic Conway groups, a finite simple group arising from the symmetries of the Leech lattice in group theory.

All labels observed (1)

Label Occurrences
Co2 canonical 1

How this entity was disambiguated

Statements (50)

Predicate Object
instanceOf Conway group
finite simple group
non-abelian simple group
perfect group
sporadic simple group
actsFaithfullyOn Leech lattice
actsOn Leech lattice
arisesFrom symmetries of the Leech lattice
definedOver integers
discoveredBy John H. Conway
surface form: John Horton Conway
hasAtlasName Co2
hasElementOfOrder 11
2
23
3
4
5
6
7
hasMinimalFaithfulLinearRepresentation 22-dimensional over GF(2)
hasMinimalFaithfulPermutationDegree 2300
hasMinimalFaithfulPermutationRepresentation degree 2300
hasOrder 42305421312000
hasOrderFactorization 2^18 · 3^6 · 5^3 · 7 · 11 · 23
hasOuterAutomorphismGroupOrder 1
hasPrimeDivisor 11
2
23
3
5
7
hasRank 2-local rank 3
hasSchurMultiplierOrder 1
hasStandardNotation Co2
hasTrivialAbelianization true
hasTrivialCenter true
isCenterless true
isFinite true
isInvolvedIn Monster group
surface form: monster group
isNonAbelian true
isOneOf 26 sporadic simple groups
three Conway groups
isSimple true
isSubgroupOf Co0
automorphism group of the Leech lattice
isSubquotientOf Monster group
surface form: monster group
isUsedIn classification of finite simple groups
finite group theory
namedAfter John H. Conway
surface form: John Horton Conway
relatedTo Leech lattice

How these facts were elicited

Referenced by (1)

Full triples — surface form annotated when it differs from this entity's canonical label.