Properties

Label 41.1.2.1a1.2-1.7.6a
Base 41.1.2.1a1.2
Degree \(7\)
e \(7\)
f \(1\)
c \(6\)

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Defining polynomial

$x^{7} + \pi$

Invariants

Residue field characteristic: $41$
Degree: $7$
Base field: $\Q_{41}(\sqrt{41\cdot 3})$
Ramification index $e$: $7$
Residue field degree $f$: $1$
Discriminant exponent $c$: $6$
Absolute Artin slopes: $[\ ]$
Swan slopes: $[\ ]$
Means: $\langle\ \rangle$
Rams: $(\ )$
Field count: $1$ (complete)
Ambiguity: $1$
Mass: $1$
Absolute Mass: $1/2$

Varying

These invariants are all associated to absolute extensions of $\Q_{ 41 }$ within this relative family, not the relative extension.

Galois group: $D_{14}$
Hidden Artin slopes: $[\ ]^{2}$
Indices of inseparability: $[0]$
Associated inertia: $[2]$
Jump Set: undefined

Fields

Galois group Galois Artin Indices
Assoc. Inertia Jump Set
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Label Polynomial $/ \Q_p$ Galois group $/ \Q_p$ Galois degree $/ \Q_p$ $\#\Aut(K/\Q_p)$ Artin slope content $/ \Q_p$ Swan slope content $/ \Q_p$ Hidden Artin slopes $/ \Q_p$ Hidden Swan slopes $/ \Q_p$ Ind. of Insep. $/ \Q_p$ Assoc. Inertia $/ \Q_p$ Resid. Poly Jump Set
41.1.14.13a1.2 $x^{14} + 246$ $D_{14}$ (as 14T3) $28$ $2$ $[\ ]_{14}^{2}$ $[\ ]_{14}^{2}$ $[\ ]^{2}$ $[\ ]^{2}$ $[0]$ $[2]$ $z^{13} + 14 z^{12} + 9 z^{11} + 36 z^{10} + 17 z^9 + 34 z^8 + 10 z^7 + 29 z^6 + 10 z^5 + 34 z^4 + 17 z^3 + 36 z^2 + 9 z + 14$ undefined
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