One refined passport of genus 8 with automorphism group $C_{18}$

• Label: 8.18-2.0.9-18-18.7
• Genus: \(8\)
• Quotient genus: \(0\)
• Group: \(C_{18}\)
• Signature: \([ 0; 9, 18, 18 ]\)
• Generating Vectors: \(1\)

Family Information

Genus:	$8$
Quotient genus:	$0$
Group name:	$C_{18}$
Group identifier:	$[18,2]$
Signature:	$[ 0; 9, 18, 18 ]$

Conjugacy classes for this refined passport:

$10, 14, 18$

The full automorphism group for this family is $C_9:D_4$ with signature $[ 0; 2, 4, 18 ]$.

Jacobian variety group algebra decomposition:

$A_{3}\times A_{3}\times E\times E$

Generating vector(s)

Displaying the unique generating vector for this refined passport.

8.18-2.0.9-18-18.7.1

	(1,8,4,3,7,6,2,9,5) (10,17,13,12,16,15,11,18,14)
	(1,17,4,12,7,15,2,18,5,10,8,13,3,16,6,11,9,14)
	(1,18,6,12,8,14,2,16,4,10,9,15,3,17,5,11,7,13)