ATLAS: Linear group L₂(7), Linear group L₃(2)

The following information is available for L₂(7) = L₃(2):

• Standard generators.
• Automorphisms.
• Black box algorithms.
• Presentations.
• Representations.
• Maximal subgroups.
• Conjugacy classes.

Standard generators

Standard generators of L₂(7):2 = PGL₂(7) = L₃(2):2 are c and d where c is in class 2B, d has order 3, cd has order 8 and cdcdd has order 4. These conditions imply that cd is in class 8A.
Standard generators of either of the double covers 2.PGL₂(7) are preimages C and D where D has order 3.

Automorphisms

To obtain our standard generators for L₂(7):2 = L₃(2):2 we may take c = u and d = b^ababb.
This forces a = [c, d]² = (cddcd)² = (ddcdc)² and b = (dc)³(ddc)³ (and u = c).

Alternatively, we can take c = u^babbab and d = b, in which case we force a = ((cd)⁴)^dcdc and b = d (and u = c^dcdcc^dcd).

Black box algorithms

• Find an element of order 2 or 4. This powers up to x in class 2A.
  [The probability of success at each attempt is 3 in 8 (about 1 in 3).]
• Find an element y of order 3.
  [The probability of success at each attempt is 1 in 3.]
• Find conjugates a of x and b of y such that ab has order 7.
  [The probability of success at each attempt is 2 in 7 (about 1 in 4).]

• Find an element of order 6. This cubes to x in class 2B.
  [The probability of success at each attempt is 1 in 6 (or 1 in 3 if you look through outer elements only).]
• Find an element of order 3 or 6. This powers up to y of order 3.
  [The probability of success at each attempt is 1 in 3.]
• Find conjugates a of x and b of y such that ab has order 8 and ababb has order 4.
  [The probability of success at each attempt is 3 in 14 (about 1 in 5).]

Presentations

< a, b | a² = b³ = (ab)⁷ = [a, b]⁴ = 1 >.

< c, d | c² = d³ = (cd)⁸ = [c, d]⁴ = 1 >.

These presentations, and those of the covering groups, are available in Magma format as follows:
L₂(7) = L₃(2) on a and b; SL₂(7) = 2.L₃(2) on A and B; PGL₂(7) = L₃(2):2 on c and d;

Representations

• L2(7) = L3(2).
• SL2(7) = 2.L3(2).
• PGL2(7) = L2(7):2 = L3(2):2.
• 2.PGL2(7) = 2.L2(7).2 = 2.L3(2).2 (plus type, the version in the ATLAS).
• 2.PGL2(7) = 2.L2(7):2 = 2.L3(2):2 (minus type, the not version in the ATLAS).
  NB: The naming of the last two groups has been swapped with respect to Version 1.

• All faithful transitive permutation representations.
  • Permutations on 7a points: a and b (Meataxe), a and b (Meataxe binary), a and b (GAP). - the action on points; primitive.
  • Permutations on 7b points: a and b (Meataxe), a and b (Meataxe binary), a and b (GAP). - the action on lines; primitive.
  • Permutations on 8 points: a and b (Meataxe), a and b (Meataxe binary), a and b (GAP). - primitive.
  • Permutations on 14a points: a and b (Meataxe), a and b (Meataxe binary), a and b (GAP). - on the cosets of A4 fixing a point.
  • Permutations on 14b points: a and b (Meataxe), a and b (Meataxe binary), a and b (GAP). - on the cosets of A4 fixing a line.
  • Permutations on 21 points: a and b (Meataxe), a and b (Meataxe binary), a and b (GAP).
  • Permutations on 24 points: a and b (Meataxe), a and b (Meataxe binary), a and b (GAP).
  • Permutations on 28 points: a and b (Meataxe), a and b (Meataxe binary), a and b (GAP).
  • Permutations on 42a points: a and b (Meataxe), a and b (Meataxe binary), a and b (GAP). - on the cosets of O2(point stab).
  • Permutations on 42b points: a and b (Meataxe), a and b (Meataxe binary), a and b (GAP). - on the cosets of O2(line stab).
  • Permutations on 42c points: a and b (Meataxe), a and b (Meataxe binary), a and b (GAP). - on the cosets of C4.
  • Permutations on 56 points: a and b (Meataxe), a and b (Meataxe binary), a and b (GAP).
  • Permutations on 84 points: a and b (Meataxe), a and b (Meataxe binary), a and b (GAP).
  • Permutations on 168 points: a and b (Meataxe), a and b (Meataxe binary), a and b (GAP). - regular.
• All faithful irreducibles in characteristic 2.
  • Dimension 3a over GF(2): a and b (Meataxe), a and b (Meataxe binary), a and b (GAP). - the natural representation as L3(2).
  • Dimension 3b over GF(2): a and b (Meataxe), a and b (Meataxe binary), a and b (GAP). - the dual of the above.
  • Dimension 8 over GF(2): a and b (Meataxe), a and b (Meataxe binary), a and b (GAP). - the Steinberg representation for L3(2).
• All faithful irreducibles in characteristic 3.
  • Dimension 3a over GF(9): a and b (Meataxe), a and b (Meataxe binary), a and b (GAP).
  • Dimension 3b over GF(9): a and b (Meataxe), a and b (Meataxe binary), a and b (GAP). - the dual of the above.
  • Dimension 6b over GF(3): a and b (Meataxe), a and b (Meataxe binary), a and b (GAP). - reducible over GF(9).
  • Dimension 6a over GF(3): a and b (Meataxe), a and b (Meataxe binary), a and b (GAP). - the deleted (7 point) permutation representation.
  • Dimension 7 over GF(3): a and b (Meataxe), a and b (Meataxe binary), a and b (GAP).
• All faithful irreducibles in characteristic 7.
  • Dimension 3 over GF(7): a and b (Meataxe), a and b (Meataxe binary), a and b (GAP). - the natural representation as O3(7).
  • Dimension 5 over GF(7): a and b (Meataxe), a and b (Meataxe binary), a and b (GAP).
  • Dimension 7 over GF(7): a and b (Meataxe), a and b (Meataxe binary), a and b (GAP). - the Steinberg representation for L2(7).
• All faithful irreducibles in characteristic 0.
  • a and b as 3 × 3 matrices over Z[b7].
  • a and b as 3 × 3 matrices over Z[b7] - the dual of the above.
  • a and b as 6 × 6 matrices over Z - reducible over Q(b7).
  • a and b as 6 × 6 matrices over Z - the deleted permutation representation.
  • a and b as 7 × 7 monomial matrices over Z.
  • a and b as 8 × 8 matrices over Z.

• All faithful transitive permutation representations.
  • Permutations on 16 points: A and B (Meataxe), A and B (Meataxe binary), A and B (GAP). - pseudoprimitive.
  • Permutations on 48 points: A and B (Meataxe), A and B (Meataxe binary), A and B (GAP).
  • Permutations on 112 points: A and B (Meataxe), A and B (Meataxe binary), A and B (GAP).
  • Permutations on 336 points: A and B (Meataxe), A and B (Meataxe binary), A and B (GAP). - regular.
• All faithful irreducibles in characteristic 3.
  • Dimension 4a over GF(9): a and b (Meataxe), a and b (Meataxe binary), a and b (GAP).
  • Dimension 4b over GF(9): a and b (Meataxe), a and b (Meataxe binary), a and b (GAP). - the dual of the above.
  • Dimension 6a over GF(9): a and b (Meataxe), a and b (Meataxe binary), a and b (GAP).
  • Dimension 6b over GF(9): a and b (Meataxe), a and b (Meataxe binary), a and b (GAP). - the dual of the above.
  • Dimension 8 over GF(3): a and b (Meataxe), a and b (Meataxe binary), a and b (GAP). - reducible over GF(9).
  • Dimension 12 over GF(3): a and b (Meataxe), a and b (Meataxe binary), a and b (GAP). - reducible over GF(9).
• All faithful irreducibles in characteristic 7.
  • Dimension 2 over GF(7): a and b (Meataxe), a and b (Meataxe binary), a and b (GAP). - the natural representation as SL2(7).
  • Dimension 4 over GF(7): a and b (Meataxe), a and b (Meataxe binary), a and b (GAP).
  • Dimension 6 over GF(7): a and b (Meataxe), a and b (Meataxe binary), a and b (GAP).
• Faithful irreducibles in characteristic 0.
  • A and B as 4 × 4 matrices over Z[b7].
  • A and B as 4 × 4 matrices over Z[b7] - the dual of the above.
  • A and B as 8 × 8 monomial matrices over Z - reducible over Q(b7).
• A and B as 5 × 5 matrices over GF(2).
• A and B as 5 × 5 matrices over GF(2).

• All faithful transitive permutation representations.
  • Permutations on 8 points: c and d (Meataxe), c and d (Meataxe binary), c and d (GAP). - primitive.
  • Permutations on 14 points: c and d (Meataxe), c and d (Meataxe binary), c and d (GAP). - pseudoprimitive.
  • Permutations on 16 points: c and d (Meataxe), c and d (Meataxe binary), c and d (GAP).
  • Permutations on 21 points: c and d (Meataxe), c and d (Meataxe binary), c and d (GAP). - primitive.
  • Permutations on 24 points: c and d (Meataxe), c and d (Meataxe binary), c and d (GAP).
  • Permutations on 28 points: c and d (Meataxe), c and d (Meataxe binary), c and d (GAP). - on the cosets of D12; primitive.
  • Permutations on 28b points: c and d (Meataxe), c and d (Meataxe binary), c and d (GAP). - on the cosets of A4.
  • Permutations on 42a points: c and d (Meataxe), c and d (Meataxe binary), c and d (GAP). - on the cosets of inner D8.
  • Permutations on 42b points: c and d (Meataxe), c and d (Meataxe binary), c and d (GAP). - on the cosets of outer D8.
  • Permutations on 42c points: c and d (Meataxe), c and d (Meataxe binary), c and d (GAP). - on the cosets of C8.
  • Permutations on 48 points: c and d (Meataxe), c and d (Meataxe binary), c and d (GAP).
  • Permutations on 56a points: c and d (Meataxe), c and d (Meataxe binary), c and d (GAP). - on the cosets of inner D6.
  • Permutations on 56b points: c and d (Meataxe), c and d (Meataxe binary), c and d (GAP). - on the cosets of outer D6.
  • Permutations on 56c points: c and d (Meataxe), c and d (Meataxe binary), c and d (GAP). - on the cosets of C6.
  • Permutations on 84a points: c and d (Meataxe), c and d (Meataxe binary), c and d (GAP). - on the cosets of inner 2^2.
  • Permutations on 84b points: c and d (Meataxe), c and d (Meataxe binary), c and d (GAP). - on the cosets of outer 2^2.
  • Permutations on 84c points: c and d (Meataxe), c and d (Meataxe binary), c and d (GAP). - on the cosets of C4.
  • Permutations on 112 points: c and d (Meataxe), c and d (Meataxe binary), c and d (GAP).
  • Permutations on 168a points: c and d (Meataxe), c and d (Meataxe binary), c and d (GAP). - on the cosets of inner C2.
  • Permutations on 168b points: c and d (Meataxe), c and d (Meataxe binary), c and d (GAP). - on the cosets of outer C2.
  • Permutations on 336 points: c and d (Meataxe), c and d (Meataxe binary), c and d (GAP). - regular.
• Both faithful irreducibles in characteristic 2.
  • c and d as 6 × 6 matrices over GF(2).
  • c and d as 8 × 8 matrices over GF(2).
• Faithful irreducibles in characteristic 3.
  • c and d as 6 × 6 matrices over GF(3).
  • c and d as 6 × 6 matrices over GF(9).
  • c and d as 12 × 12 matrices over GF(3) - reducible over GF(9).
  • c and d as 7 × 7 matrices over GF(3).
• Faithful irreducibles in characteristic 0.
  • c and d as 6 × 6 matrices over Z.
  • c and d as 6 × 6 matrices over Z[r2].
  • c and d as 12 × 12 matrices over Z - reducible over Q(r2).
  • c and d as 7 × 7 matrices over Z.
  • c and d as 8 × 8 matrices over Z.

• All faithful transitive permutation representations.
  • Permutations on 32 points: C and D (Meataxe), C and D (Meataxe binary), C and D (GAP). - pseudoprimitive.
  • Permutations on 96 points: C and D (Meataxe), C and D (Meataxe binary), C and D (GAP).
  • Permutations on 224 points: C and D (Meataxe), C and D (Meataxe binary), C and D (GAP).
  • Permutations on 672 points: C and D (Meataxe), C and D (Meataxe binary), C and D (GAP). - regular.

• All faithful transitive permutation representations.
  • Permutations on 16a points: C and D (Meataxe), C and D (Meataxe binary), C and D (GAP). - pseudoprimitive.
  • Permutations on 16b points: C and D (Meataxe), C and D (Meataxe binary), C and D (GAP). - pseudoprimitive.
  • Permutations on 32 points: C and D (Meataxe), C and D (Meataxe binary), C and D (GAP).
  • Permutations on 48a points: C and D (Meataxe), C and D (Meataxe binary), C and D (GAP).
  • Permutations on 48b points: C and D (Meataxe), C and D (Meataxe binary), C and D (GAP).
  • Permutations on 96 points: C and D (Meataxe), C and D (Meataxe binary), C and D (GAP).
  • Permutations on 112a points: C and D (Meataxe), C and D (Meataxe binary), C and D (GAP). - on the cosets of D6; pseudoprimitive.
  • Permutations on 112b points: C and D (Meataxe), C and D (Meataxe binary), C and D (GAP). - on the cosets of C6; not pseudoprimitive.
  • Permutations on 224 points: C and D (Meataxe), C and D (Meataxe binary), C and D (GAP).
  • Permutations on 336 points: C and D (Meataxe), C and D (Meataxe binary), C and D (GAP).
  • Permutations on 672 points: C and D (Meataxe), C and D (Meataxe binary), C and D (GAP). - regular.

Maximal subgroups

• S₄, with [standard?] generators abbaba, b; or a^ba, b; or a, b^abb. - the point stabiliser.
• S₄, with [standard?] generators ababba, b; or a^bba, b; or a, b^ab. - the line stabiliser.
• 7:3 = F₂₁, with generators abababba, b; or b^abba, b; or b^aba, b.

The maximal subgroups of L₂(7):2 = L₃(2):2 are as follows.

• L₂(7), with standard generators ((cd)⁴)^dcdc, d.
• 7:6 = F₄₂, with generators c, d²cdcd.
• D₁₆, with generators c, (dcdcd)².
• D₁₂, with generators c, (cd)⁴.

Conjugacy classes

• 1A: identity.
• 2A: a.
• 3A: b; B is class +3A.
• 4A: ababb or [a, b]; ABABB is class +4A.
• 7A: ab; AB is class +7A.
• 7B: abb; ABB is class -7B.

• 1A: identity.
• 2A: cdcdcdcd = (cd)^4.
• 3A: d.
• 4A: cdcd = (cd)^2 or [c, d].
• 7AB: cdcdcddcdd or [c, dcd].
• 2B: c.
• 6A: cdcdcdd.
• 8A: cd.
• 8B: cdcdcd = (cd)^3.

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