$p$-adic field 2.3.6.30a1.10

• Label: 2.3.6.30a1.10
• Base: \(\Q_{2}\)
• Degree: \(18\)
• e: \(6\)
• f: \(3\)
• c: \(30\)
• Galois group: $C_2^5.(A_4\times S_4)$ (as 18T544)

Defining polynomial

$( x^{3} + x + 1 )^{6} + 2 ( x^{3} + x + 1 )^{5} + 4 ( x^{3} + x + 1 )^{4} + 4 x ( x^{3} + x + 1 ) + 2$

Invariants

Base field:	$\Q_{2}$
Degree $d$:	$18$
Ramification index $e$:	$6$
Residue field degree $f$:	$3$
Discriminant exponent $c$:	$30$
Discriminant root field:	$\Q_{2}(\sqrt{-1})$
Root number:	$-i$
$\Aut(K/\Q_{2})$:	$C_2$
This field is not Galois over $\Q_{2}.$
Visible Artin slopes:	$[\frac{8}{3}]$
Visible Swan slopes:	$[\frac{5}{3}]$
Means:	$\langle\frac{5}{6}\rangle$
Rams:	$(5)$
Jump set:	$[3, 9]$
Roots of unity:	$14 = (2^{ 3 } - 1) \cdot 2$

Intermediate fields

2.3.1.0a1.1, 2.1.3.2a1.1, 2.3.3.6a1.1

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

Canonical tower

Unramified subfield:	2.3.1.0a1.1 $\cong \Q_{2}(t)$ where $t$ is a root of \( x^{3} + x + 1 \)
Relative Eisenstein polynomial:	\( x^{6} + 2 x^{5} + 4 x^{4} + 4 t^{2} x + 2 \) $\ \in\Q_{2}(t)[x]$

Ramification polygon

Residual polynomials:	$z^4 + z^2 + 1$,$z + t^2$
Associated inertia:	$2$,$1$
Indices of inseparability:	$[5, 0]$

Invariants of the Galois closure

Galois degree:	$9216$
Galois group:	$C_2^5.(A_4\times S_4)$ (as 18T544)
Inertia group:	Intransitive group isomorphic to $C_2^3\wr C_3$
Wild inertia group:	$C_2^9$
Galois unramified degree:	$6$
Galois tame degree:	$3$
Galois Artin slopes:	$[\frac{4}{3}, \frac{4}{3}, \frac{4}{3}, \frac{4}{3}, 2, 2, 2, \frac{8}{3}, \frac{8}{3}]$
Galois Swan slopes:	$[\frac{1}{3},\frac{1}{3},\frac{1}{3},\frac{1}{3},1,1,1,\frac{5}{3},\frac{5}{3}]$
Galois mean slope:	$2.4778645833333335$
Galois splitting model:	$x^{18} - 498 x^{16} - 105507 x^{14} + 42039603 x^{12} + 4711229127 x^{10} - 943847653914 x^{8} - 69990175320516 x^{6} + 8433721243853235 x^{4} + 315560707131381525 x^{2} - 28421843093527005375$