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Genus Dimension of the family Group order Hyperelliptic curves Full automorphism group
Quotient genus Signature Group identifier Cyclic trigonal curves
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Results (12 matches)

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Refined passport label Genus Group Group order Dimension Signature Generating vectors
13.78-4.0.2-6-39.1 $13$ $C_3\times D_{13}$ $78$ $0$ $[ 0; 2, 6, 39 ]$ $(1,40)\cdots(39,67),\ldots$
13.78-4.0.2-6-39.2 $13$ $C_3\times D_{13}$ $78$ $0$ $[ 0; 2, 6, 39 ]$ $(1,40)\cdots(39,67),\ldots$
13.78-4.0.2-6-39.3 $13$ $C_3\times D_{13}$ $78$ $0$ $[ 0; 2, 6, 39 ]$ $(1,40)\cdots(39,67),\ldots$
13.78-4.0.2-6-39.4 $13$ $C_3\times D_{13}$ $78$ $0$ $[ 0; 2, 6, 39 ]$ $(1,40)\cdots(39,67),\ldots$
13.78-4.0.2-6-39.5 $13$ $C_3\times D_{13}$ $78$ $0$ $[ 0; 2, 6, 39 ]$ $(1,40)\cdots(39,67),\ldots$
13.78-4.0.2-6-39.6 $13$ $C_3\times D_{13}$ $78$ $0$ $[ 0; 2, 6, 39 ]$ $(1,40)\cdots(39,67),\ldots$
13.78-4.0.2-6-39.7 $13$ $C_3\times D_{13}$ $78$ $0$ $[ 0; 2, 6, 39 ]$ $(1,40)\cdots(39,67),\ldots$
13.78-4.0.2-6-39.8 $13$ $C_3\times D_{13}$ $78$ $0$ $[ 0; 2, 6, 39 ]$ $(1,40)\cdots(39,67),\ldots$
13.78-4.0.2-6-39.9 $13$ $C_3\times D_{13}$ $78$ $0$ $[ 0; 2, 6, 39 ]$ $(1,40)\cdots(39,67),\ldots$
13.78-4.0.2-6-39.10 $13$ $C_3\times D_{13}$ $78$ $0$ $[ 0; 2, 6, 39 ]$ $(1,40)\cdots(39,67),\ldots$
13.78-4.0.2-6-39.11 $13$ $C_3\times D_{13}$ $78$ $0$ $[ 0; 2, 6, 39 ]$ $(1,40)\cdots(39,67),\ldots$
13.78-4.0.2-6-39.12 $13$ $C_3\times D_{13}$ $78$ $0$ $[ 0; 2, 6, 39 ]$ $(1,40)\cdots(39,67),\ldots$
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