Family of higher genus curves with automorphisms search results

Results (32 matches)

 

Refined passport label	Genus	Quotient genus	Group	Group order	Dimension	Signature	Hyperelliptic	Cyclic trigonal	Generating vectors
15.128-147.0.2-4-32.1	$15$	$0$	$D_{16}:C_4$	$128$	$0$	$[ 0; 2, 4, 32 ]$	✓		$(1,33)\cdots(96,123),\ldots$
15.128-147.0.2-4-32.2	$15$	$0$	$D_{16}:C_4$	$128$	$0$	$[ 0; 2, 4, 32 ]$	✓		$(1,33)\cdots(96,123),\ldots$
15.128-147.0.2-4-32.3	$15$	$0$	$D_{16}:C_4$	$128$	$0$	$[ 0; 2, 4, 32 ]$	✓		$(1,33)\cdots(96,123),\ldots$
15.128-147.0.2-4-32.4	$15$	$0$	$D_{16}:C_4$	$128$	$0$	$[ 0; 2, 4, 32 ]$	✓		$(1,33)\cdots(96,123),\ldots$
15.128-147.0.2-4-32.5	$15$	$0$	$D_{16}:C_4$	$128$	$0$	$[ 0; 2, 4, 32 ]$	✓		$(1,33)\cdots(96,123),\ldots$
15.128-147.0.2-4-32.6	$15$	$0$	$D_{16}:C_4$	$128$	$0$	$[ 0; 2, 4, 32 ]$	✓		$(1,33)\cdots(96,123),\ldots$
15.128-147.0.2-4-32.7	$15$	$0$	$D_{16}:C_4$	$128$	$0$	$[ 0; 2, 4, 32 ]$	✓		$(1,33)\cdots(96,123),\ldots$
15.128-147.0.2-4-32.8	$15$	$0$	$D_{16}:C_4$	$128$	$0$	$[ 0; 2, 4, 32 ]$	✓		$(1,33)\cdots(96,123),\ldots$
15.128-147.0.2-4-32.9	$15$	$0$	$D_{16}:C_4$	$128$	$0$	$[ 0; 2, 4, 32 ]$	✓		$(1,33)\cdots(96,123),\ldots$
15.128-147.0.2-4-32.10	$15$	$0$	$D_{16}:C_4$	$128$	$0$	$[ 0; 2, 4, 32 ]$	✓		$(1,33)\cdots(96,123),\ldots$
15.128-147.0.2-4-32.31	$15$	$0$	$D_{16}:C_4$	$128$	$0$	$[ 0; 2, 4, 32 ]$	✓		$(1,41)\cdots(96,115),\ldots$
15.128-147.0.2-4-32.11	$15$	$0$	$D_{16}:C_4$	$128$	$0$	$[ 0; 2, 4, 32 ]$	✓		$(1,33)\cdots(96,123),\ldots$
15.128-147.0.2-4-32.12	$15$	$0$	$D_{16}:C_4$	$128$	$0$	$[ 0; 2, 4, 32 ]$	✓		$(1,33)\cdots(96,123),\ldots$
15.128-147.0.2-4-32.13	$15$	$0$	$D_{16}:C_4$	$128$	$0$	$[ 0; 2, 4, 32 ]$	✓		$(1,33)\cdots(96,123),\ldots$
15.128-147.0.2-4-32.14	$15$	$0$	$D_{16}:C_4$	$128$	$0$	$[ 0; 2, 4, 32 ]$	✓		$(1,33)\cdots(96,123),\ldots$
15.128-147.0.2-4-32.15	$15$	$0$	$D_{16}:C_4$	$128$	$0$	$[ 0; 2, 4, 32 ]$	✓		$(1,33)\cdots(96,123),\ldots$
15.128-147.0.2-4-32.16	$15$	$0$	$D_{16}:C_4$	$128$	$0$	$[ 0; 2, 4, 32 ]$	✓		$(1,33)\cdots(96,123),\ldots$
15.128-147.0.2-4-32.17	$15$	$0$	$D_{16}:C_4$	$128$	$0$	$[ 0; 2, 4, 32 ]$	✓		$(1,41)\cdots(96,115),\ldots$
15.128-147.0.2-4-32.18	$15$	$0$	$D_{16}:C_4$	$128$	$0$	$[ 0; 2, 4, 32 ]$	✓		$(1,41)\cdots(96,115),\ldots$
15.128-147.0.2-4-32.19	$15$	$0$	$D_{16}:C_4$	$128$	$0$	$[ 0; 2, 4, 32 ]$	✓		$(1,41)\cdots(96,115),\ldots$
15.128-147.0.2-4-32.20	$15$	$0$	$D_{16}:C_4$	$128$	$0$	$[ 0; 2, 4, 32 ]$	✓		$(1,41)\cdots(96,115),\ldots$
15.128-147.0.2-4-32.21	$15$	$0$	$D_{16}:C_4$	$128$	$0$	$[ 0; 2, 4, 32 ]$	✓		$(1,41)\cdots(96,115),\ldots$
15.128-147.0.2-4-32.22	$15$	$0$	$D_{16}:C_4$	$128$	$0$	$[ 0; 2, 4, 32 ]$	✓		$(1,41)\cdots(96,115),\ldots$
15.128-147.0.2-4-32.23	$15$	$0$	$D_{16}:C_4$	$128$	$0$	$[ 0; 2, 4, 32 ]$	✓		$(1,41)\cdots(96,115),\ldots$
15.128-147.0.2-4-32.24	$15$	$0$	$D_{16}:C_4$	$128$	$0$	$[ 0; 2, 4, 32 ]$	✓		$(1,41)\cdots(96,115),\ldots$
15.128-147.0.2-4-32.25	$15$	$0$	$D_{16}:C_4$	$128$	$0$	$[ 0; 2, 4, 32 ]$	✓		$(1,41)\cdots(96,115),\ldots$
15.128-147.0.2-4-32.26	$15$	$0$	$D_{16}:C_4$	$128$	$0$	$[ 0; 2, 4, 32 ]$	✓		$(1,41)\cdots(96,115),\ldots$
15.128-147.0.2-4-32.27	$15$	$0$	$D_{16}:C_4$	$128$	$0$	$[ 0; 2, 4, 32 ]$	✓		$(1,41)\cdots(96,115),\ldots$
15.128-147.0.2-4-32.28	$15$	$0$	$D_{16}:C_4$	$128$	$0$	$[ 0; 2, 4, 32 ]$	✓		$(1,41)\cdots(96,115),\ldots$
15.128-147.0.2-4-32.29	$15$	$0$	$D_{16}:C_4$	$128$	$0$	$[ 0; 2, 4, 32 ]$	✓		$(1,41)\cdots(96,115),\ldots$
15.128-147.0.2-4-32.30	$15$	$0$	$D_{16}:C_4$	$128$	$0$	$[ 0; 2, 4, 32 ]$	✓		$(1,41)\cdots(96,115),\ldots$
15.128-147.0.2-4-32.32	$15$	$0$	$D_{16}:C_4$	$128$	$0$	$[ 0; 2, 4, 32 ]$	✓		$(1,41)\cdots(96,115),\ldots$