Defining polynomial
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$( x^{3} + 2 x + 1 )^{3} + 3 x ( x^{3} + 2 x + 1 ) + 3$
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Invariants
| Base field: | $\Q_{3}$ |
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| Degree $d$: | $9$ |
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| Ramification index $e$: | $3$ |
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| Residue field degree $f$: | $3$ |
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| Discriminant exponent $c$: | $9$ |
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| Discriminant root field: | $\Q_{3}(\sqrt{3})$ | |
| Root number: | $i$ | |
| $\Aut(K/\Q_{3})$: | $C_1$ | |
| This field is not Galois over $\Q_{3}.$ | ||
| Visible Artin slopes: | $[\frac{3}{2}]$ | |
| Visible Swan slopes: | $[\frac{1}{2}]$ | |
| Means: | $\langle\frac{1}{3}\rangle$ | |
| Rams: | $(\frac{1}{2})$ | |
| Jump set: | undefined | |
| Roots of unity: | $26 = (3^{ 3 } - 1)$ |
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Intermediate fields
| 3.3.1.0a1.1 |
Fields in the database are given up to isomorphism. Isomorphic intermediate fields are shown with their multiplicities.
Canonical tower
| Unramified subfield: | 3.3.1.0a1.1 $\cong \Q_{3}(t)$ where $t$ is a root of
\( x^{3} + 2 x + 1 \)
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| Relative Eisenstein polynomial: |
\( x^{3} + \left(3 t + 3\right) x + 3 \)
$\ \in\Q_{3}(t)[x]$
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Ramification polygon
| Residual polynomials: | $z + t$ |
| Associated inertia: | $1$ |
| Indices of inseparability: | $[1, 0]$ |
Invariants of the Galois closure
| Galois degree: | $162$ |
| Galois group: | $C_3^3:C_6$ (as 9T22) |
| Inertia group: | Intransitive group isomorphic to $C_3^2:S_3$ |
| Wild inertia group: | $C_3^3$ |
| Galois unramified degree: | $3$ |
| Galois tame degree: | $2$ |
| Galois Artin slopes: | $[\frac{3}{2}, \frac{3}{2}, \frac{3}{2}]$ |
| Galois Swan slopes: | $[\frac{1}{2},\frac{1}{2},\frac{1}{2}]$ |
| Galois mean slope: | $1.462962962962963$ |
| Galois splitting model: | $x^{9} - 3 x^{7} - 5 x^{6} - 18 x^{5} - 18 x^{4} + 19 x^{3} + 9 x^{2} - 27 x - 1$ |