Group invariants
| Abstract group: | $(C_3\times D_9^2).S_3^2$ |
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| Order: | $34992=2^{4} \cdot 3^{7}$ |
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| Cyclic: | no |
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| Abelian: | no |
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| Solvable: | yes |
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| Nilpotency class: | not nilpotent |
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Group action invariants
| Degree $n$: | $36$ |
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| Transitive number $t$: | $14142$ |
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| Parity: | $-1$ |
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| Transitivity: | 1 | ||
| Primitive: | no |
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| $\card{\Aut(F/K)}$: | $1$ |
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| Generators: | $(1,11,2,10,3,12)(4,6,5)(7,9,8)(13,35,15,36,14,34)(22,27)(23,26)(24,25)(28,29,30)(31,32,33)$, $(1,34)(2,35)(3,36)(4,30,6,28,5,29)(7,32,9,33,8,31)(10,13,12,15,11,14)(16,18)(19,20)(22,27,23,25,24,26)$, $(1,20,13,7,26,33,3,19,15,8,25,31,2,21,14,9,27,32)(4,22,28,36,18,11,5,24,29,35,17,10,6,23,30,34,16,12)$ |
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Low degree resolvents
$\card{(G/N)}$ Galois groups for stem field(s) $2$: $C_2$ x 7 $4$: $C_2^2$ x 7 $6$: $S_3$ x 3 $8$: $D_{4}$ x 2, $C_2^3$ $12$: $D_{6}$ x 9 $16$: $D_4\times C_2$ $24$: $S_3 \times C_2^2$ x 3, $(C_6\times C_2):C_2$ x 2 $36$: $S_3^2$ x 3 $48$: 12T28 x 2, 24T25 $72$: $C_3^2:D_4$, 12T37 x 3 $108$: 12T71 $144$: 12T77, 12T81, 24T204 x 2 $216$: 12T116, 24T548 $432$: 12T156 x 2, 24T1284, 24T1292 $1296$: 12T217, 24T2908 x 2 $1944$: 18T353 $3888$: 24T7285, 36T4734 $11664$: 36T9485 x 2 Resolvents shown for degrees $\leq 47$
Subfields
Degree 2: $C_2$
Degree 3: None
Degree 4: $D_{4}$
Degree 6: $C_3^2:D_4$
Degree 9: None
Degree 12: 12T78
Degree 18: None
Low degree siblings
36T14142Siblings are shown with degree $\leq 47$
A number field with this Galois group has no arithmetically equivalent fields.
Conjugacy classes
Conjugacy classes not computed
Character table
144 x 144 character table
Regular extensions
Data not computed