Local Number Field 3.12.19.45

• Label: 3.12.19.45
• Base: \(\Q_{3}\)
• Degree: \(12\)
• e: \(12\)
• f: \(1\)
• c: \(19\)
• Galois group: $C_3\times C_3:D_4$ (as 12T42)

Defining polynomial

\( x^{12} + 12 x^{11} + 3 x^{10} + 9 x^{9} - 12 x^{8} + 9 x^{7} + 9 x^{6} - 9 x^{5} + 12 x^{3} - 6 \)

Invariants

Base field:	$\Q_{3}$
Degree $d$ :	$12$
Ramification exponent $e$ :	$12$
Residue field degree $f$ :	$1$
Discriminant exponent $c$ :	$19$
Discriminant root field:	$\Q_{3}(\sqrt{3})$
Root number:	$i$
$|\Aut(K/\Q_{ 3 })|$:	$6$
This field is not Galois over $\Q_{3}$.

Intermediate fields

$\Q_{3}(\sqrt{3*})$, 3.4.3.1, 3.6.9.15

Fields in the database are given up to isomorphism. Isomorphic intermediate fields are shown with their multiplicities.

Unramified/totally ramified tower

Unramified subfield:	$\Q_{3}$
Relative Eisenstein polynomial:	\( x^{12} + 12 x^{11} + 3 x^{10} + 9 x^{9} - 12 x^{8} + 9 x^{7} + 9 x^{6} - 9 x^{5} + 12 x^{3} - 6 \)

Invariants of the Galois closure

Galois group:	$C_3\times C_3:D_4$ (as 12T42)
Inertia group:	$C_3\times (C_3 : C_4)$
Unramified degree:	$2$
Tame degree:	$4$
Wild slopes:	[3/2, 2]
Galois mean slope:	$7/4$
Galois splitting model:	$x^{12} - 8 x^{9} + 30 x^{6} - 20 x^{3} + 4$