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Residue characteristic $p$ Rel. degree $n$ Rel. ram. index $e$ Rel. res. field degree $f$ Rel. disc. exponent $c$
Base Base degree $n_0$ Base ram. index $e_0$ Base res. field degree $f_0$ Base disc. exponent $c_0$
Herbrand invariant Abs. degree $n_{\mathrm{abs}}$ Abs. ram. index $e_{\mathrm{abs}}$ Abs. res. field degree $f_{\mathrm{abs}}$ Abs. disc. exponent $c_{\mathrm{abs}}$
Mass Absolute mass Ambiguity Field count Wild segments
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Label $p$ $n$ $f$ $e$ $c$ Base Abs. Artin slopes Swan slopes Means Rams Generic poly Ambiguity Field count Mass
13.1.2.1a1.2-2.1.0a $13$ $2$ $2$ $1$ $0$ $\Q_{13}(\sqrt{13\cdot 2})$ $[\ ]$ $[ ]$ $\langle \rangle$ $( )$ $x$ $2$ $1$ $1$
13.1.2.1a1.2-1.2.1a $13$ $2$ $1$ $2$ $1$ $\Q_{13}(\sqrt{13\cdot 2})$ $[\ ]$ $[ ]$ $\langle \rangle$ $( )$ $x^2 + d_{0} \pi$ $2$ $2$ $1$
13.1.2.1a1.2-3.1.0a $13$ $3$ $3$ $1$ $0$ $\Q_{13}(\sqrt{13\cdot 2})$ $[\ ]$ $[ ]$ $\langle \rangle$ $( )$ $x$ $3$ $1$ $1$
13.1.2.1a1.2-1.3.2a $13$ $3$ $1$ $3$ $2$ $\Q_{13}(\sqrt{13\cdot 2})$ $[\ ]$ $[ ]$ $\langle \rangle$ $( )$ $x^3 + d_{0} \pi$ $3$ $3$ $1$
13.1.2.1a1.2-4.1.0a $13$ $4$ $4$ $1$ $0$ $\Q_{13}(\sqrt{13\cdot 2})$ $[\ ]$ $[ ]$ $\langle \rangle$ $( )$ $x$ $4$ $1$ $1$
13.1.2.1a1.2-2.2.2a $13$ $4$ $2$ $2$ $2$ $\Q_{13}(\sqrt{13\cdot 2})$ $[\ ]$ $[ ]$ $\langle \rangle$ $( )$ $x^2 + d_{0} \pi$ $4$ $2$ $1$
13.1.2.1a1.2-1.4.3a $13$ $4$ $1$ $4$ $3$ $\Q_{13}(\sqrt{13\cdot 2})$ $[\ ]$ $[ ]$ $\langle \rangle$ $( )$ $x^4 + d_{0} \pi$ $4$ $2$ $1$
13.1.2.1a1.2-5.1.0a $13$ $5$ $5$ $1$ $0$ $\Q_{13}(\sqrt{13\cdot 2})$ $[\ ]$ $[ ]$ $\langle \rangle$ $( )$ $x$ $5$ $1$ $1$
13.1.2.1a1.2-1.5.4a $13$ $5$ $1$ $5$ $4$ $\Q_{13}(\sqrt{13\cdot 2})$ $[\ ]$ $[ ]$ $\langle \rangle$ $( )$ $x^5 + \pi$ $1$ $1$ $1$
13.1.2.1a1.2-6.1.0a $13$ $6$ $6$ $1$ $0$ $\Q_{13}(\sqrt{13\cdot 2})$ $[\ ]$ $[ ]$ $\langle \rangle$ $( )$ $x$ $6$ $1$ $1$
13.1.2.1a1.2-3.2.3a $13$ $6$ $3$ $2$ $3$ $\Q_{13}(\sqrt{13\cdot 2})$ $[\ ]$ $[ ]$ $\langle \rangle$ $( )$ $x^2 + d_{0} \pi$ $6$ $2$ $1$
13.1.2.1a1.2-2.3.4a $13$ $6$ $2$ $3$ $4$ $\Q_{13}(\sqrt{13\cdot 2})$ $[\ ]$ $[ ]$ $\langle \rangle$ $( )$ $x^3 + d_{0} \pi$ $6$ $3$ $1$
13.1.2.1a1.2-1.6.5a $13$ $6$ $1$ $6$ $5$ $\Q_{13}(\sqrt{13\cdot 2})$ $[\ ]$ $[ ]$ $\langle \rangle$ $( )$ $x^6 + d_{0} \pi$ $6$ $6$ $1$
13.1.2.1a1.2-7.1.0a $13$ $7$ $7$ $1$ $0$ $\Q_{13}(\sqrt{13\cdot 2})$ $[\ ]$ $[ ]$ $\langle \rangle$ $( )$ $x$ $7$ $1$ $1$
13.1.2.1a1.2-1.7.6a $13$ $7$ $1$ $7$ $6$ $\Q_{13}(\sqrt{13\cdot 2})$ $[\ ]$ $[ ]$ $\langle \rangle$ $( )$ $x^7 + \pi$ $1$ $1$ $1$
13.1.2.1a1.2-8.1.0a $13$ $8$ $8$ $1$ $0$ $\Q_{13}(\sqrt{13\cdot 2})$ $[\ ]$ $[ ]$ $\langle \rangle$ $( )$ $x$ $8$ $1$ $1$
13.1.2.1a1.2-4.2.4a $13$ $8$ $4$ $2$ $4$ $\Q_{13}(\sqrt{13\cdot 2})$ $[\ ]$ $[ ]$ $\langle \rangle$ $( )$ $x^2 + d_{0} \pi$ $8$ $2$ $1$
13.1.2.1a1.2-2.4.6a $13$ $8$ $2$ $4$ $6$ $\Q_{13}(\sqrt{13\cdot 2})$ $[\ ]$ $[ ]$ $\langle \rangle$ $( )$ $x^4 + d_{0} \pi$ $8$ $4$ $1$
13.1.2.1a1.2-1.8.7a $13$ $8$ $1$ $8$ $7$ $\Q_{13}(\sqrt{13\cdot 2})$ $[\ ]$ $[ ]$ $\langle \rangle$ $( )$ $x^8 + d_{0} \pi$ $4$ $2$ $1$
13.1.2.1a1.2-9.1.0a $13$ $9$ $9$ $1$ $0$ $\Q_{13}(\sqrt{13\cdot 2})$ $[\ ]$ $[ ]$ $\langle \rangle$ $( )$ $x$ $9$ $1$ $1$
13.1.2.1a1.2-3.3.6a $13$ $9$ $3$ $3$ $6$ $\Q_{13}(\sqrt{13\cdot 2})$ $[\ ]$ $[ ]$ $\langle \rangle$ $( )$ $x^3 + d_{0} \pi$ $9$ $3$ $1$
13.1.2.1a1.2-1.9.8a $13$ $9$ $1$ $9$ $8$ $\Q_{13}(\sqrt{13\cdot 2})$ $[\ ]$ $[ ]$ $\langle \rangle$ $( )$ $x^9 + d_{0} \pi$ $3$ $3$ $1$
13.1.2.1a1.2-10.1.0a $13$ $10$ $10$ $1$ $0$ $\Q_{13}(\sqrt{13\cdot 2})$ $[\ ]$ $[ ]$ $\langle \rangle$ $( )$ $x$ $10$ $1$ $1$
13.1.2.1a1.2-5.2.5a $13$ $10$ $5$ $2$ $5$ $\Q_{13}(\sqrt{13\cdot 2})$ $[\ ]$ $[ ]$ $\langle \rangle$ $( )$ $x^2 + d_{0} \pi$ $10$ $2$ $1$
13.1.2.1a1.2-2.5.8a $13$ $10$ $2$ $5$ $8$ $\Q_{13}(\sqrt{13\cdot 2})$ $[\ ]$ $[ ]$ $\langle \rangle$ $( )$ $x^5 + \pi$ $2$ $1$ $1$
13.1.2.1a1.2-1.10.9a $13$ $10$ $1$ $10$ $9$ $\Q_{13}(\sqrt{13\cdot 2})$ $[\ ]$ $[ ]$ $\langle \rangle$ $( )$ $x^{10} + d_{0} \pi$ $2$ $2$ $1$
13.1.2.1a1.2-11.1.0a $13$ $11$ $11$ $1$ $0$ $\Q_{13}(\sqrt{13\cdot 2})$ $[\ ]$ $[ ]$ $\langle \rangle$ $( )$ $x$ $11$ $1$ $1$
13.1.2.1a1.2-1.11.10a $13$ $11$ $1$ $11$ $10$ $\Q_{13}(\sqrt{13\cdot 2})$ $[\ ]$ $[ ]$ $\langle \rangle$ $( )$ $x^{11} + \pi$ $1$ $1$ $1$
13.1.2.1a1.2-12.1.0a $13$ $12$ $12$ $1$ $0$ $\Q_{13}(\sqrt{13\cdot 2})$ $[\ ]$ $[ ]$ $\langle \rangle$ $( )$ $x$ $12$ $0$ $1$
13.1.2.1a1.2-6.2.6a $13$ $12$ $6$ $2$ $6$ $\Q_{13}(\sqrt{13\cdot 2})$ $[\ ]$ $[ ]$ $\langle \rangle$ $( )$ $x^2 + d_{0} \pi$ $12$ $0$ $1$
13.1.2.1a1.2-4.3.8a $13$ $12$ $4$ $3$ $8$ $\Q_{13}(\sqrt{13\cdot 2})$ $[\ ]$ $[ ]$ $\langle \rangle$ $( )$ $x^3 + d_{0} \pi$ $12$ $0$ $1$
13.1.2.1a1.2-3.4.9a $13$ $12$ $3$ $4$ $9$ $\Q_{13}(\sqrt{13\cdot 2})$ $[\ ]$ $[ ]$ $\langle \rangle$ $( )$ $x^4 + d_{0} \pi$ $12$ $0$ $1$
13.1.2.1a1.2-2.6.10a $13$ $12$ $2$ $6$ $10$ $\Q_{13}(\sqrt{13\cdot 2})$ $[\ ]$ $[ ]$ $\langle \rangle$ $( )$ $x^6 + d_{0} \pi$ $12$ $0$ $1$
13.1.2.1a1.2-1.12.11a $13$ $12$ $1$ $12$ $11$ $\Q_{13}(\sqrt{13\cdot 2})$ $[\ ]$ $[ ]$ $\langle \rangle$ $( )$ $x^{12} + d_{0} \pi$ $12$ $0$ $1$
13.1.2.1a1.2-13.1.0a $13$ $13$ $13$ $1$ $0$ $\Q_{13}(\sqrt{13\cdot 2})$ $[\ ]$ $[ ]$ $\langle \rangle$ $( )$ $x$ $13$ $0$ $1$
13.1.2.1a1.2-1.13.13a $13$ $13$ $1$ $13$ $13$ $\Q_{13}(\sqrt{13\cdot 2})$ $[\frac{25}{24}]$ $[\frac{1}{12}]$ $\langle\frac{1}{13}\rangle$ $(\frac{1}{12})$ $x^{13} + a_{1} \pi x + \pi$ $1$ $0$ $12$
13.1.2.1a1.2-1.13.14a $13$ $13$ $1$ $13$ $14$ $\Q_{13}(\sqrt{13\cdot 2})$ $[\frac{13}{12}]$ $[\frac{1}{6}]$ $\langle\frac{2}{13}\rangle$ $(\frac{1}{6})$ $x^{13} + a_{2} \pi x^2 + \pi$ $1$ $0$ $12$
13.1.2.1a1.2-1.13.15a $13$ $13$ $1$ $13$ $15$ $\Q_{13}(\sqrt{13\cdot 2})$ $[\frac{9}{8}]$ $[\frac{1}{4}]$ $\langle\frac{3}{13}\rangle$ $(\frac{1}{4})$ $x^{13} + a_{3} \pi x^3 + \pi$ $1$ $0$ $12$
13.1.2.1a1.2-1.13.16a $13$ $13$ $1$ $13$ $16$ $\Q_{13}(\sqrt{13\cdot 2})$ $[\frac{7}{6}]$ $[\frac{1}{3}]$ $\langle\frac{4}{13}\rangle$ $(\frac{1}{3})$ $x^{13} + a_{4} \pi x^4 + \pi$ $1$ $0$ $12$
13.1.2.1a1.2-1.13.17a $13$ $13$ $1$ $13$ $17$ $\Q_{13}(\sqrt{13\cdot 2})$ $[\frac{29}{24}]$ $[\frac{5}{12}]$ $\langle\frac{5}{13}\rangle$ $(\frac{5}{12})$ $x^{13} + a_{5} \pi x^5 + \pi$ $1$ $0$ $12$
13.1.2.1a1.2-1.13.18a $13$ $13$ $1$ $13$ $18$ $\Q_{13}(\sqrt{13\cdot 2})$ $[\frac{5}{4}]$ $[\frac{1}{2}]$ $\langle\frac{6}{13}\rangle$ $(\frac{1}{2})$ $x^{13} + a_{6} \pi x^6 + \pi$ $1$ $0$ $12$
13.1.2.1a1.2-1.13.19a $13$ $13$ $1$ $13$ $19$ $\Q_{13}(\sqrt{13\cdot 2})$ $[\frac{31}{24}]$ $[\frac{7}{12}]$ $\langle\frac{7}{13}\rangle$ $(\frac{7}{12})$ $x^{13} + a_{7} \pi x^7 + \pi$ $1$ $0$ $12$
13.1.2.1a1.2-1.13.20a $13$ $13$ $1$ $13$ $20$ $\Q_{13}(\sqrt{13\cdot 2})$ $[\frac{4}{3}]$ $[\frac{2}{3}]$ $\langle\frac{8}{13}\rangle$ $(\frac{2}{3})$ $x^{13} + a_{8} \pi x^8 + \pi$ $1$ $0$ $12$
13.1.2.1a1.2-1.13.21a $13$ $13$ $1$ $13$ $21$ $\Q_{13}(\sqrt{13\cdot 2})$ $[\frac{11}{8}]$ $[\frac{3}{4}]$ $\langle\frac{9}{13}\rangle$ $(\frac{3}{4})$ $x^{13} + a_{9} \pi x^9 + \pi$ $1$ $0$ $12$
13.1.2.1a1.2-1.13.22a $13$ $13$ $1$ $13$ $22$ $\Q_{13}(\sqrt{13\cdot 2})$ $[\frac{17}{12}]$ $[\frac{5}{6}]$ $\langle\frac{10}{13}\rangle$ $(\frac{5}{6})$ $x^{13} + a_{10} \pi x^{10} + \pi$ $1$ $0$ $12$
13.1.2.1a1.2-1.13.23a $13$ $13$ $1$ $13$ $23$ $\Q_{13}(\sqrt{13\cdot 2})$ $[\frac{35}{24}]$ $[\frac{11}{12}]$ $\langle\frac{11}{13}\rangle$ $(\frac{11}{12})$ $x^{13} + a_{11} \pi x^{11} + \pi$ $1$ $0$ $12$
13.1.2.1a1.2-1.13.24a $13$ $13$ $1$ $13$ $24$ $\Q_{13}(\sqrt{13\cdot 2})$ $[\frac{3}{2}]$ $[1]$ $\langle\frac{12}{13}\rangle$ $(1)$ $x^{13} + a_{12} \pi x^{12} + c_{13} \pi^2 + \pi$ $13$ $0$ $12$
13.1.2.1a1.2-1.13.26a $13$ $13$ $1$ $13$ $26$ $\Q_{13}(\sqrt{13\cdot 2})$ $[\frac{19}{12}]$ $[\frac{7}{6}]$ $\langle\frac{14}{13}\rangle$ $(\frac{7}{6})$ $x^{13} + b_{15} \pi^2 x^2 + a_{14} \pi^2 x + \pi$ $1$ $0$ $156$
13.1.2.1a1.2-1.13.27a $13$ $13$ $1$ $13$ $27$ $\Q_{13}(\sqrt{13\cdot 2})$ $[\frac{13}{8}]$ $[\frac{5}{4}]$ $\langle\frac{15}{13}\rangle$ $(\frac{5}{4})$ $x^{13} + b_{16} \pi^2 x^3 + a_{15} \pi^2 x^2 + \pi$ $1$ $0$ $156$
13.1.2.1a1.2-1.13.28a $13$ $13$ $1$ $13$ $28$ $\Q_{13}(\sqrt{13\cdot 2})$ $[\frac{5}{3}]$ $[\frac{4}{3}]$ $\langle\frac{16}{13}\rangle$ $(\frac{4}{3})$ $x^{13} + b_{17} \pi^2 x^4 + a_{16} \pi^2 x^3 + \pi$ $1$ $0$ $156$
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