ATLAS: Unitary group U₃(3), Derived group G₂(2)'

Order = 6048 = 2⁵.3³.7.
Mult = 1.
Out = 2.

Standard generators

Standard generators of U₃(3) are a and b where a has order 2, b has order 6 and ab has order 7.

Standard generators of U₃(3):2 = G₂(2) are c and d where c is in class 2B, d is in class 4D and cd has order 7.

Presentations

Presentations of U₃(3) and U₃(3):2 = G₂(2) on their standard generators are given below.

< a, b | a² = b⁶ = (ab)⁷ = [a, (ab²)³] = b³[b², ab³a]² = 1 >.

< c, d | c² = d⁴ = (cd)⁷ = [c, d]⁶ = (cd(cd²)³)² = [d², cdc]³ = 1 >.

Representations

The representations of U₃(3) available are:

All primitive permutation representations.
- Permutations on 28 points: a and b (Meataxe), a and b (Meataxe binary), a and b (GAP).
- Permutations on 36 points: a and b (Meataxe), a and b (Meataxe binary), a and b (GAP).
- Permutations on 63[a] points - on the cosets of 4.S4: a and b (Meataxe), a and b (Meataxe binary), a and b (GAP).
- Permutations on 63[b] points - on the cosets of 4^2:S3: a and b (Meataxe), a and b (Meataxe binary), a and b (GAP).
All faithful irreducibles in characteristic 2.
- Dimension 6 over GF(2): a and b (Meataxe), a and b (Meataxe binary), a and b (GAP).
- Dimension 14 over GF(2): a and b (Meataxe), a and b (Meataxe binary), a and b (GAP).
- Dimension 32[a] over GF(2): a and b (Meataxe), a and b (Meataxe binary), a and b (GAP).
- Dimension 32[b] over GF(2) - the dual of the above: a and b (Meataxe), a and b (Meataxe binary), a and b (GAP).
All faithful irreducibles in characteristic 3 (up to Frobenius automorphisms).
- Dimension 3[b] over GF(9) - the natural representation: a and b (Meataxe), a and b (Meataxe binary), a and b (GAP).
- Dimension 6[b] over GF(9): a and b (Meataxe), a and b (Meataxe binary), a and b (GAP).
- Dimension 7 over GF(3): a and b (Meataxe), a and b (Meataxe binary), a and b (GAP).
- Dimension 15[b] over GF(9): a and b (Meataxe), a and b (Meataxe binary), a and b (GAP).
- Dimension 27 over GF(3): a and b (Meataxe), a and b (Meataxe binary), a and b (GAP).
All faithful irreducibles in characteristic 7 (up to Frobenius automorphisms).
- Dimension 6 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).
- Dimension 7[b] over GF(49): a and b (Meataxe), a and b (Meataxe binary), a and b (GAP).
- Dimension 14 over GF(7): a and b (Meataxe), a and b (Meataxe binary), a and b (GAP).
- Dimension 21 over GF(7): a and b (Meataxe), a and b (Meataxe binary), a and b (GAP).
- Dimension 21[b] over GF(49): a and b (Meataxe), a and b (Meataxe binary), a and b (GAP).
- Dimension 26 over GF(7): a and b (Meataxe), a and b (Meataxe binary), a and b (GAP).
- Dimension 28[a] over GF(49): a and b (Meataxe), a and b (Meataxe binary), a and b (GAP).
Some faithful irreducibles in characteristic 0
- Dimension 6 over Z[i]: a and b (GAP).
- Dimension 7 over Z: a and b (GAP).
- Dimension 7 over Z[i]: a and b (GAP).
- Dimension 14 over Z (reducible over Z[i]): a and b (GAP).
- Dimension 14 over Z: a and b (GAP).
- Dimension 21 over Z: a and b (GAP).
- Dimension 21 over Z[i]: a and b (GAP).
- Dimension 42 over Z (reducible over Z[i]): a and b (GAP).
- Dimension 27 over Z: a and b (GAP).
- Dimension 28 over Z[i]: a and b (GAP).
- Dimension 56 over Z (reducible over Z[i]): a and b (GAP).
- Dimension 64 over Z (reducible over Q(b7)): a and b (GAP).

The representations of U₃(3):2 = G₂(2) available are:

Permutations on 63 points - on the cosets of 4^2:D12: c and d (Meataxe), c and d (Meataxe binary), c and d (GAP).
All faithful irreducibles in characteristic 2.
- Dimension 6 over GF(2) - exhibiting the isomorphism with G2(2): c and d (Meataxe), c and d (Meataxe binary), c and d (GAP).
- Dimension 14 over GF(2): c and d (Meataxe), c and d (Meataxe binary), c and d (GAP).
- Dimension 64 over GF(2): c and d (Meataxe), c and d (Meataxe binary), c and d (GAP).
All faithful irreducibles in characteristic 3 - up to tensoring with linear characters.
- Dimension 6 over GF(3): c and d (Meataxe), c and d (Meataxe binary), c and d (GAP).
- Dimension 12 over GF(3): c and d (Meataxe), c and d (Meataxe binary), c and d (GAP).
- Dimension 7 over GF(3): c and d (Meataxe), c and d (Meataxe binary), c and d (GAP).
- Dimension 30 over GF(3): c and d (Meataxe), c and d (Meataxe binary), c and d (GAP).
- Dimension 27 over GF(3): c and d (Meataxe), c and d (Meataxe binary), c and d (GAP).

Maximal subgroups

The maximal subgroups of U₃(3) are as follows.

3¹⁺²:8, with generators here.
L₂(7), with generators here.
4.S₄.
4²:S₃, with generators here.

The maximal subgroups of U₃(3):2 = G₂(2) are as follows.

U₃(3), with standard generators dd, cdcddd.
3¹⁺²:8:2.
L₂(7):2.
4.S₄:2.
4²:D₁₂.

Conjugacy classes

At the moment, we are only going to give enough class representatives so that we can sort out some of our generality problems.

Representatives of some of the 14 conjugacy classes of U₃(3) are given below.

1A: identity [or a²].
2A: a.
3A: b².
3B: abab^-1 or [a, b].
4A: (ab^-2)³.
4B: (ab²)³.
4C: ab³.
6A: b.
7A: ab.
7B: ab^-1.
8A: ab²ab^-1.
8B: abab^-2.
12A: ab².
12B: ab^-2.

Representatives of some of the 16 conjugacy classes of U₃(3):2 are given below.

1A: identity [or c²].
2A: d².
3A: .
3B: .
4AB: .
4C: .
6A: .
7AB: cd.
8AB: .
12AB: .
2B: c.
4C: d.
6B: .
8C: .
12C: .
12D: .

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