ATLAS: Linear group L₅(2)

Standard generators of L₅(2):2 are c and d where c is in class 2C, d is in class 8B, cd has order 21 and cdcdd has order 8. (NB: it is not possible to have d in 8C with these other properties.)

Standard generators of L₅(2):2 may be obtained as follows: c is the given automorphism and d = cab.
To return to L₅(2), the pair (a', b') = (dddd, (cdd)^-1cdcdcddcdcdcddcdcdd) is equivalent to (a, b) (i.e. they are conjugate in L₅(2):2).

< a, b | a² = b⁵ = (ab)²¹ = [a, b]⁴ = [a, b²]² = (ababab^-2)⁴ = 1 >.

< c, d | c² = d⁸ = (cd)²¹ = (cd⁴)⁴ = [c, d]⁵ = [c, d²]² = (cdcdcdcd^-2)² = 1 >.

• Permutations on 31 points: a and b (Meataxe), a and b (Meataxe binary), a and b (GAP).
• Permutations on 155 points: a and b (Meataxe), a and b (Meataxe binary), a and b (GAP).
• Some irreducibles in characteristic 2:
  • Dimension 5 over GF(2): a and b (Meataxe), a and b (Meataxe binary), a and b (GAP). - the natural representation.
  • Dimension 5 over GF(2): a and b (Meataxe), a and b (Meataxe binary), a and b (GAP).
  • Dimension 10 over GF(2): a and b (Meataxe), a and b (Meataxe binary), a and b (GAP).
  • Dimension 10 over GF(2): a and b (Meataxe), a and b (Meataxe binary), a and b (GAP).
  • Dimension 24 over GF(2): a and b (Meataxe), a and b (Meataxe binary), a and b (GAP).
• Some irreducibles in characteristic 3:
  • Dimension 30 over GF(3): a and b (Meataxe), a and b (Meataxe binary), a and b (GAP).
  • Dimension 124 over GF(3): a and b (Meataxe), a and b (Meataxe binary), a and b (GAP).
  • Dimension 155 over GF(3): a and b (Meataxe), a and b (Meataxe binary), a and b (GAP).
• Some irreducibles in characteristic 5:
  • Dimension 30 over GF(5): a and b (Meataxe), a and b (Meataxe binary), a and b (GAP).
  • Dimension 123 over GF(5): a and b (Meataxe), a and b (Meataxe binary), a and b (GAP).
  • Dimension 155 over GF(5): a and b (Meataxe), a and b (Meataxe binary), a and b (GAP).
  • Dimension 280 over GF(5): a and b (Meataxe), a and b (Meataxe binary), a and b (GAP).
• Some irreducibles in characteristic 7:
  • Dimension 30 over GF(7): a and b (Meataxe), a and b (Meataxe binary), a and b (GAP).
  • Dimension 94 over GF(7): a and b (Meataxe), a and b (Meataxe binary), a and b (GAP).
• Some irreducibles in characteristic 31:
  • Dimension 29 over GF(31): a and b (Meataxe), a and b (Meataxe binary), a and b (GAP).
  • Dimension 124 over GF(31): a and b (Meataxe), a and b (Meataxe binary), a and b (GAP).
  • Dimension 251 over GF(31): a and b (Meataxe), a and b (Meataxe binary), a and b (GAP).

• Permutations on 62 points: c and d (Meataxe), c and d (Meataxe binary), c and d (GAP).
• Dimension 10 over GF(2): c and d (Meataxe), c and d (Meataxe binary), c and d (GAP).
• Dimension 20 over GF(2): c and d (Meataxe), c and d (Meataxe binary), c and d (GAP).
• Dimension 24 over GF(2): c and d (Meataxe), c and d (Meataxe binary), c and d (GAP).
• Dimension 30 over GF(9): c and d (Meataxe), c and d (Meataxe binary), c and d (GAP).
• Dimension 30 over GF(25): c and d (Meataxe), c and d (Meataxe binary), c and d (GAP).
• Dimension 30 over GF(7): c and d (Meataxe), c and d (Meataxe binary), c and d (GAP).
• Dimension 29 over GF(31): c and d (Meataxe), c and d (Meataxe binary), c and d (GAP).
• Dimension 30 over Z[r2]: c and d (Magma).

• 2⁴:L₄(2)
• 2⁴:L₄(2)
• 2⁶:(S₃ × L₃(2))
• 2⁶:(S₃ × L₃(2))
• 31:5, with generators (abbababb(abb)^-1, (abababb)^16(ababb)(abababb)^15).

• L₅(2), with standard generators (dddd, (cdd)^-1cdcdcddcdcdcddcdcdd).
• 2¹⁺⁶:L₃(2):2
• L₄(2):2 = S₈
• 2⁴⁺⁴:(S₃ × S₃):2
• S₃ × L₃(2):2
• 31:10, with generators d^-1cd, (cdd)^-4cdcdcddcdcdcddcd(cdd)^4.

A set of generators for the maximal cyclic subgroups of L₅(2):2 can be obtained by running this program on the standard generators. All conjugacy classes can therefore be obtained as suitable powers of these elements.

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