Defining polynomial
\(x^{15} - 60 x^{12} + 45 x^{11} + 15 x^{10} + 4425 x^{9} - 1800 x^{8} + 75 x^{7} + 17575 x^{6} + 66450 x^{5} + 8625 x^{4} - 5625 x^{3} + 1875 x^{2} + 1125 x + 125\) |
Invariants
Base field: | $\Q_{5}$ |
Degree $d$: | $15$ |
Ramification exponent $e$: | $5$ |
Residue field degree $f$: | $3$ |
Discriminant exponent $c$: | $15$ |
Discriminant root field: | $\Q_{5}(\sqrt{5\cdot 2})$ |
Root number: | $1$ |
$\card{ \Aut(K/\Q_{ 5 }) }$: | $3$ |
This field is not Galois over $\Q_{5}.$ | |
Visible slopes: | $[5/4]$ |
Intermediate fields
5.3.0.1, 5.5.5.3 |
Fields in the database are given up to isomorphism. Isomorphic intermediate fields are shown with their multiplicities.
Unramified/totally ramified tower
Unramified subfield: | 5.3.0.1 $\cong \Q_{5}(t)$ where $t$ is a root of \( x^{3} + 3 x + 3 \) |
Relative Eisenstein polynomial: | \( x^{5} + \left(15 t^{2} + 20 t + 10\right) x^{2} + 15 x + 5 \) $\ \in\Q_{5}(t)[x]$ |
Ramification polygon
Residual polynomials: | $z + 2$ |
Associated inertia: | $1$ |
Indices of inseparability: | $[1, 0]$ |
Invariants of the Galois closure
Galois group: | $C_3\times F_5$ (as 15T8) |
Inertia group: | Intransitive group isomorphic to $F_5$ |
Wild inertia group: | $C_5$ |
Unramified degree: | $3$ |
Tame degree: | $4$ |
Wild slopes: | $[5/4]$ |
Galois mean slope: | $23/20$ |
Galois splitting model: | $x^{15} - 5 x^{14} - 30 x^{13} + 105 x^{12} + 500 x^{11} - 976 x^{10} - 3110 x^{9} + 690 x^{8} + 16045 x^{7} + 565 x^{6} - 4932 x^{5} - 65245 x^{4} + 18535 x^{3} + 23695 x^{2} + 7350 x - 105209$ |