Abelian variety isogeny class 2.13.c_s over $\F_{13}$

• Label: 2.13.c_s
• Base field: $\F_{13}$
• Dimension: $2$
• $p$-rank: $2$
• Ordinary: yes
• Supersingular: no
• Simple: no
• Geometrically simple: no
• Primitive: yes
• Principally polarizable: yes
• Contains a Jacobian: yes

Invariants

Base field:	$\F_{13}$
Dimension:	$2$
L-polynomial:	$( 1 - 2 x + 13 x^{2} )( 1 + 4 x + 13 x^{2} )$
	$1 + 2 x + 18 x^{2} + 26 x^{3} + 169 x^{4}$
Frobenius angles:	$\pm0.410543812489$, $\pm0.687167041811$
Angle rank:	$2$ (numerical)
Jacobians:	$32$
Cyclic group of points:	no
Non-cyclic primes:	$2, 3$

This isogeny class is not simple, primitive, ordinary, and not supersingular. It is principally polarizable and contains a Jacobian.

Newton polygon

This isogeny class is ordinary.

$p$-rank:	$2$
Slopes:	$[0, 0, 1, 1]$

Point counts

Point counts of the abelian variety

$r$	$1$	$2$	$3$	$4$	$5$
$A(\F_{q^r})$	$216$	$34560$	$4776408$	$818380800$	$137503241496$

Point counts of the curve

$r$	$1$	$2$	$3$	$4$	$5$	$6$	$7$	$8$	$9$	$10$
$C(\F_{q^r})$	$16$	$202$	$2176$	$28654$	$370336$	$4822234$	$62776240$	$815767006$	$10604208688$	$137858472682$

Jacobians and polarizations

This isogeny class is principally polarizable and contains the Jacobians of 32 curves (of which all are hyperelliptic):

• $y^2=7 x^6+3 x^5+11 x^3+10 x^2+12 x+7$
• $y^2=x^6+3 x^5+9 x^4+5 x^3+4 x^2+2 x+4$
• $y^2=10 x^6+11 x^5+7 x^4+3 x^3+8 x^2+5 x+8$
• $y^2=11 x^6+4 x^5+10 x^4+3 x^3+10 x^2+4 x+11$
• $y^2=12 x^6+10 x^5+8 x^4+12 x^3+8 x^2+10 x+12$
• $y^2=11 x^6+2 x^5+3 x^4+3 x^3+x^2+6 x+11$
• $y^2=12 x^6+9 x^5+2 x^4+7 x^3+11 x^2+8 x+1$
• $y^2=2 x^6+9 x^5+5 x^4+5 x^3+x^2+9 x+10$
• $y^2=3 x^5+12 x^4+x^3+8 x^2+2 x$
• $y^2=12 x^6+11 x^5+9 x^4+12 x^3+6 x^2+3 x+8$
• $y^2=3 x^6+12 x^5+2 x^4+9 x^3+7 x^2+6$
• $y^2=10 x^5+5 x^4+3 x^3+7 x+2$
• $y^2=2 x^5+12 x^4+9 x^3+2 x^2+2 x$
• $y^2=2 x^6+8 x^5+3 x^4+x^3+12 x^2+11 x+11$
• $y^2=4 x^6+7 x^5+9 x^4+11 x^3+10 x^2+4 x+11$
• $y^2=3 x^6+2 x^5+9 x^4+3 x^3+x^2+11 x+10$
• $y^2=4 x^6+12 x^5+x^4+7 x^3+3 x^2+7 x+12$
• $y^2=12 x^6+7 x^5+11 x^4+5 x^3+10 x^2+9 x+1$
• $y^2=9 x^6+3 x^5+3 x^4+x^3+4 x^2+x+4$
• $y^2=2 x^6+8 x^5+6 x^4+x^3+2 x^2+6 x+10$
• and

• $y^2=x^6+7 x^5+9 x^4+9 x^3+x^2+7 x+1$
• $y^2=11 x^6+2 x^5+3 x^4+4 x^3+3 x^2+2 x+11$
• $y^2=7 x^6+x^5+3 x^4+2 x^3+3 x^2+x+7$
• $y^2=12 x^6+9 x^5+12 x^4+5 x^3+12 x^2+9 x+12$
• $y^2=3 x^6+4 x^5+12 x^3+10 x+3$
• $y^2=4 x^6+3 x^5+6 x^4+5 x^3+6 x^2+3 x+4$
• $y^2=x^6+6 x^5+2 x^4+6 x^3+9 x^2+9 x+9$
• $y^2=4 x^6+8 x^5+12 x^4+5 x^3+2 x^2+6 x+3$
• $y^2=5 x^6+5 x^5+12 x^4+9 x^3+9 x^2+5 x+7$
• $y^2=9 x^6+12 x^5+7 x^4+x^3+12 x^2+8 x$
• $y^2=9 x^6+10 x^5+9 x^3+8 x^2+2 x+1$
• $y^2=3 x^5+4 x^4+5 x^3+5 x^2+12 x+10$

Decomposition and endomorphism algebra

All geometric endomorphisms are defined over $\F_{13}$.

Endomorphism algebra over $\F_{13}$

The isogeny class factors as 1.13.ac $\times$ 1.13.e and its endomorphism algebra is a direct product of the endomorphism algebras for each isotypic factor. The endomorphism algebra for each factor is:

• 1.13.ac : \(\Q(\sqrt{-3}) \).
• 1.13.e : \(\Q(\sqrt{-1}) \).

Base change

This is a primitive isogeny class.

Twists

Below are some of the twists of this isogeny class.

Twist	Extension degree	Common base change
2.13.ag_bi	$2$	2.169.bg_vm
2.13.ac_s	$2$	2.169.bg_vm
2.13.g_bi	$2$	2.169.bg_vm
2.13.ab_g	$3$	(not in LMFDB)
2.13.l_cc	$3$	(not in LMFDB)