Group action invariants
| Degree $n$ : | $16$ | |
| Transitive number $t$ : | $1868$ | |
| Parity: | $1$ | |
| Primitive: | No | |
| Nilpotency class: | $-1$ (not nilpotent) | |
| Generators: | (1,12,2,11)(3,16,7,13)(4,15,8,14)(5,10,6,9), (1,11,7,9,4,15,2,12,8,10,3,16)(5,13,6,14) | |
| $|\Aut(F/K)|$: | $2$ |
Low degree resolvents
|G/N| Galois groups for stem field(s) 2: $C_2$ x 3 4: $C_2^2$ 8: $D_{4}$ 72: $C_3^2:D_4$ 1152: $S_4\wr C_2$ x 3 18432: 16T1793 36864: 32T1515320 Resolvents shown for degrees $\leq 47$
Subfields
Degree 2: $C_2$
Degree 4: None
Degree 8: $S_4\wr C_2$
Low degree siblings
16T1868 x 11, 32T1831788 x 6, 32T1831789 x 6, 32T1831790 x 6Siblings are shown with degree $\leq 47$
A number field with this Galois group has no arithmetically equivalent fields.
Conjugacy Classes
There are 104 conjugacy classes of elements. Data not shown.
Group invariants
| Order: | $73728=2^{13} \cdot 3^{2}$ | |
| Cyclic: | No | |
| Abelian: | No | |
| Solvable: | Yes | |
| GAP id: | Data not available |
| Character table: Data not available. |