ATLAS: Linear group L₃(4), Mathieu group M₂₁ (main index)

The following information is available on this page for L₃(4) = M₂₁:

• Index to the subpages.
• Standard generators (for the almost simple groups only).
• Presentations.
• Representations (info).

Index to subpages

• L3(4) and covers.
• L3(4):2a and `covers' - not available.
• L3(4):2b and `covers' - not available.
• L3(4):2c and `covers' - not available.
• L3(4):3 and `covers' - not available.
• L3(4):6 and `covers' - not available.
• L3(4):2^2 and `covers' - not available.
• L3(4):3:2b and `covers' - not available.
• L3(4):3:2c and `covers' - not available.
• L3(4):D12 and `covers' - not available.

Standard generators (for the groups L₃(4).A only)

Note

L3(4) and covers

• Standard generators of L3(4) are a and b where a has order 2, b has order 4, ab has order 7 and abb has order 5.
• Standard generators of the triple cover 3.L3(4) are preimages A and B where A has order 2 and B has order 4.
• Standard generators of the double cover 2.L3(4) are preimages A and B where AB has order 7, ABB has order 5 and ABABABBB has order 5.
• Standard generators of the quadruple cover 4a.L3(4) are preimages A and B where B has order 4, AB has order 7 and ABB has order 5.
• Standard generators of the quadruple cover 4b.L3(4) are preimages A and B where B has order 4, AB has order 7 and ABB has order 5.
• Standard generators of the sextuple cover 6.L3(4) are preimages A and B where AB has order 2, B has order 4, AB has order 21, ABB has order 5 and ABABABBB has order 5.
• Standard generators of the twelvefold cover 12a.L3(4) are preimages A and B where A has order 2, B has order 4, AB has order 21 and ABB has order 5.
• Standard generators of the twelvefold cover 12b.L3(4) are preimages A and B where A has order 2, B has order 4, AB has order 21 and ABB has order 5.

L3(4):2a and covers

• Standard generators of L3(4):2a are c and d where c is in class 2B, d is in class 4D and cd has order 7.
• Standard generators of the triple cover 3.L3(4):2a are preimages C and D where C has order 2, and D has order 4.
• Standard generators of the quadruple cover 4a.L3(4):2a are preimages C and D where CD has order 7 ... and some other condition(s).

L3(4):2b and covers

• Standard generators of L3(4):2b are e and f where e is in class 2C, f has order 5 and ef has order 14, and eff has order 8.

L3(4):6 and covers

• Standard generators of L3(4):6 are k and l where k is in class 2B, l is in class 6C, kl has order 21, and klkll has order 4.

L3(4):S3a and covers

• Standard generators of L3(4):S3a = L3(4):3:2b are o and p where o is in class 2C, p is in class 3C and op has order 14.
• Standard generators of any of the triple covers 3.L3(4).S3a = L3(4).3:2b are preimages O and P. No further conditions are needed.

L3(4):S3b and covers

• Standard generators of L3(4):S3b = L3(4):3:2c are q and r where q is in class 2D, r is in class 3C, qr has order 8 and qrqrr has order 15.
• Standard generators of any of the triple covers 3.L3(4).S3b = L3(4).3:2c are preimages Q and R. No further conditions are needed.

L3(4):D12 and covers

• Standard generators of L3(4):D12 are s and t where s is in class 2D, t is in class 4E, st has order 6, stt has order 6 and ststtsttt has order 8.
• Standard generators of any of the triple covers 3.L3(4).D12 are preimages S and T. No other conditions are needed.

Automorphisms

Automorphisms of L3(4)

Automorphisms of L3(4):2_1

Presentations

Representations

L3(4) and covers

• The representations of L3(4) available are
  • a and b as 9 × 9 matrices over GF(2).
  • a and b as 8 × 8 matrices over GF(4).
  • a and b as 15 × 15 matrices over GF(3).
  • a and b as 19 × 19 matrices over GF(7).
  • a and b as permutations on 21 points.
• The representations of 3.L3(4) available are
  • A and B as 3 × 3 matrices over GF(4) - the natural representation.
  • A and B as permutations on 63 points.
• The representations of 4_1.L3(4) available are
  • A and B as 8 × 8 matrices over GF(9).
  • A and B as 8 × 8 matrices over GF(5).
  • A and B as 8 × 8 matrices over GF(49).
  • A and B as permutations on 480 points.
• The representations of 4_2.L3(4) available are
  • A and B as 4 × 4 matrices over GF(9).
• The representations of 6.L3(4) available are
  • A and B as 6 × 6 matrices over GF(7).
  • A and B as 6 × 6 matrices over GF(25).
  The representations of 12_1.L3(4) available are
  • A and B as 24 × 24 matrices over GF(25).
  • A and B as 24 × 24 matrices over GF(49).
  The representations of 12_2.L3(4) available are
  • A and B as 36 × 36 matrices over GF(25).
  • A and B as 12 × 12 matrices over GF(49).

L3(4):2a and covers

• The representation of L3(4):2a available is
  • c and d as 18 × 18 matrices over GF(2).
  The representation of 3.L3(4):2a available is
  • C and D as 6 × 6 matrices over GF(4).
  The representation of 4a.L3(4):2a available is
  • C and D as 16 × 16 matrices over GF(5).

L3(4):2b and covers

• The representation of L3(4):2b available is
  • e and f as 9 × 9 matrices over GF(2).

L3(4):2c and covers

• The representation of 4_1.L3(4):2_3 available is
  • g and h as 16 × 16 matrices over GF(7).

L3(4):6 and covers

• The representations of L3(4):6 available are
  • k and l as 19 × 19 matrices over GF(3).
  • k and l as 45 × 45 matrices over GF(3).
• The representations of groups isoclinic to 4^2.L3(4).6 available are
  • K and L as 24 × 24 matrices over GF(9).
  • K and L as 48 × 48 matrices over GF(49).

L3(4):D12 and covers

• The representations of L3(4):D12 available are
  • s and t as permutations on 42 points.
  • s and t as 18 × 18 matrices over GF(2) - changed to standard generators on 24/10/98.
  • s and t as 19 × 19 matrices over GF(3) - changed to standard generators on 24/10/98.

Go to main ATLAS (version 2.0) page

Go to linear groups page

Go to old L3(4) page - ATLAS version 1