Conway group Co1
Sporadic simple group
For general background and history of the Conway sporadic groups, see
Conway group .
In the area of modern algebra known as group theory , the Conway group Co1 is a sporadic simple group of order
4,157,776,806,543,360,000
= 221 · 39 · 54 · 72 · 11 · 13 · 23
≈ 4× 10 18 .
History and properties
Co1 is one of the 26 sporadic groups and was discovered by John Horton Conway in 1968. It is the largest of the three sporadic Conway groups and can be obtained as the quotient of Co0 (group of automorphisms of the Leech lattice Λ that fix the origin) by its center , which consists of the scalar matrices ±1. It also appears at the top of the automorphism group of the even 26-dimensional unimodular lattice II25,1 . Some rather cryptic comments in Witt's collected works suggest that he found the Leech lattice and possibly the order of its automorphism group in unpublished work in 1940.
The outer automorphism group is trivial and the Schur multiplier has order 2.
Involutions
Co0 has 4 conjugacy classes of involutions; these collapse to 2 in Co1 , but there are 4-elements in Co0 that correspond to a third class of involutions in Co1 .
An image of a dodecad has a centralizer of type 211 :M12 :2, which is contained in a maximal subgroup of type 211 :M24 .
An image of an octad or 16-set has a centralizer of the form 21+8 .O+ 8 (2), a maximal subgroup.
Representations
The smallest faithful permutation representation of Co1 is on the 98280 pairs {v ,–v } of norm 4 vectors.
There is a matrix representation of dimension 24 over the field
F
2
{\displaystyle \mathbb {F} _{2}}
.
The centralizer of an involution of type 2B in the monster group is of the form 21+24 Co1 .
The Dynkin diagram of the even Lorentzian unimodular lattice II1,25 is isometric to the (affine) Leech lattice Λ, so the group of diagram automorphisms is split extension Λ,Co0 of affine isometries of the Leech lattice.
Maximal subgroups
Wilson (1983) found the 22 conjugacy classes of maximal subgroups of Co1 , though there were some errors in this list, corrected by Wilson (1988) .
Maximal subgroups of Co1
No.
Structure
Order
Index
Comments
1
Co2
42,305,421,312,000 = 218 ·36 ·53 ·7·11·23
98,280 = 23 ·33 ·5·7·13
2
3 · Suz :2
2,690,072,985,600 = 214 ·38 ·52 ·7·11·13
1,545,600 = 27 ·3·52 ·7·23
the lift to Aut(Λ) = Co0 fixes a complex structure or changes it to the complex conjugate structure; also, top of Suzuki chain
3
211 :M24
501,397,585,920 = 221 ·33 ·5·7·11·23
8,292,375 = 36 ·53 ·7·13
image of monomial subgroup from Aut(Λ), that subgroup stabilizing the standard frame of 48 vectors of form (±8,023 )
4
Co3
495,766,656,000 = 210 ·37 ·53 ·7·11·23
8,386,560 = 211 ·32 ·5·7·13
5
21+8 · O+ 8 (2)
89,181,388,800 = 221 ·35 ·52 ·7
46,621,575 = 34 ·52 ·7·11·13·23
centralizer of an involution of class 2A (image of octad from Aut(Λ))
6
Fi21 :S3 ≈ U6 (2):S3
55,180,984,320 = 216 ·37 ·5·7·11
75,348,000 = 25 ·32 ·53 ·7·13·23
the lift to Aut(Λ) is the symmetry group of a coplanar hexagon of 6 type 2 points
7
(A4 × G2 (4)):2
6,038,323,200 = 215 ·34 ·52 ·7·13
688,564,800 = 26 ·35 ·52 ·7·11·23
in Suzuki chain
8
22+12 :(A8 × S3 )
1,981,808,640 = 221 ·33 ·5·7
2,097,970,875 = 36 ·53 ·7·11·13·23
9
24+12 · (S3 × 3.S6 )
849,346,560 = 221 ·34 ·5
4,895,265,375 = 35 ·53 ·72 ·11·13·23
10
32 · U4 (3).D8
235,146,240 = 210 ·38 ·5·7
17,681,664,000 = 211 ·3·53 ·7·11·13·23
11
36 :2.M12
138,568,320 = 27 ·39 ·5·11
30,005,248,000 = 214 ·53 ·72 ·13·23
holomorph of ternary Golay code
12
(A5 × J2 ):2
72,576,000 = 210 ·34 ·53 ·7
57,288,591,360 = 211 ·35 ·5·7·11·13·23
in Suzuki chain
13
31+4 :2.S4 (3).2
25,194,240 = 28 ·39 ·5
165,028,864,000 = 213 ·53 ·72 ·11·13·23
14
(A6 × U3 (3)).2
4,354,560 = 29 ·35 ·5·7
954,809,856,000 = 212 ·34 ·53 ·7·11·13·23
in Suzuki chain
15
33+4 :2.(S4 × S4 )
2,519,424 = 27 ·39
1,650,288,640,000 = 214 ·54 ·72 ·11·13·23
16
A9 × S3
1,088,640 = 27 ·35 ·5·7
3,819,239,424,000 = 214 ·34 ·53 ·7·11·13·23
in Suzuki chain
17
(A7 × L2 (7)):2
846,720 = 27 ·33 ·5·72
4,910,450,688,000 = 214 ·36 ·53 ·11·13·23
in Suzuki chain
18
(D10 × (A5 × A5 ).2).2
144,000 = 27 ·32 ·53
28,873,450,045,440 = 214 ·37 ·5·72 ·11·13·23
19
51+2 :GL2 (5)
60,000 = 25 ·3·54
69,296,280,109,056 = 216 ·38 ·72 ·11·13·23
20
53 :(4 × A5 ).2
60,000 = 25 ·3·54
69,296,280,109,056 = 216 ·38 ·72 ·11·13·23
21
72 :(3 × 2.S4 )
3,528 = 23 ·32 ·72
1,178,508,165,120,000 = 218 ·37 ·54 ·11·13·23
22
52 :2A5
3,000 = 23 ·3·53
1,385,925,602,181,120 = 218 ·38 ·5·72 ·11·13·23
References
Conway, John Horton (1968), "A perfect group of order 8,315,553,613,086,720,000 and the sporadic simple groups", Proceedings of the National Academy of Sciences of the United States of America , 61 (2): 398–400, Bibcode :1968PNAS...61..398C , doi :10.1073/pnas.61.2.398 , MR 0237634 , PMC 225171 , PMID 16591697
Brauer, R. ; Sah, Chih-han, eds. (1969), Theory of finite groups: A symposium , W. A. Benjamin, Inc., New York-Amsterdam, MR 0240186
Conway, John Horton (1969), "A group of order 8,315,553,613,086,720,000", The Bulletin of the London Mathematical Society , 1 : 79–88, doi :10.1112/blms/1.1.79 , ISSN 0024-6093 , MR 0248216
Conway, John Horton (1971), "Three lectures on exceptional groups", in Powell, M. B.; Higman, Graham (eds.), Finite simple groups , Proceedings of an Instructional Conference organized by the London Mathematical Society (a NATO Advanced Study Institute), Oxford, September 1969., Boston, MA: Academic Press , pp. 215–247, ISBN 978-0-12-563850-0 , MR 0338152 Reprinted in Conway & Sloane (1999 , 267-298)
Conway, John Horton ; Sloane, Neil J. A. (1999), Sphere Packings, Lattices and Groups , Grundlehren der Mathematischen Wissenschaften, vol. 290 (3rd ed.), Berlin, New York: Springer-Verlag , doi :10.1007/978-1-4757-2016-7 , ISBN 978-0-387-98585-5 , MR 0920369
Thompson, Thomas M. (1983), From error-correcting codes through sphere packings to simple groups , Carus Mathematical Monographs, vol. 21, Mathematical Association of America , ISBN 978-0-88385-023-7 , MR 0749038
Conway, John Horton ; Parker, Richard A.; Norton, Simon P.; Curtis, R. T.; Wilson, Robert A. (1985), Atlas of finite groups , Oxford University Press , ISBN 978-0-19-853199-9 , MR 0827219
Griess, Robert L. Jr. (1998), Twelve sporadic groups , Springer Monographs in Mathematics, Berlin, New York: Springer-Verlag , doi :10.1007/978-3-662-03516-0 , ISBN 978-3-540-62778-4 , MR 1707296
Wilson, Robert A. (1983), "The maximal subgroups of Conway's group Co₁", Journal of Algebra , 85 (1): 144–165, doi :10.1016/0021-8693(83)90122-9 , ISSN 0021-8693 , MR 0723071
Wilson, Robert A. (1988), "On the 3-local subgroups of Conway's group Co₁", Journal of Algebra , 113 (1): 261–262, doi :10.1016/0021-8693(88)90192-5 , ISSN 0021-8693 , MR 0928064
Wilson, Robert A. (2009), The finite simple groups. , Graduate Texts in Mathematics 251, vol. 251, Berlin, New York: Springer-Verlag , doi :10.1007/978-1-84800-988-2 , ISBN 978-1-84800-987-5 , Zbl 1203.20012
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