Elliptic curve 132.1-d1 over number field \(\Q(\sqrt{33}) \)

• Label: 2.2.33.1-132.1-d1
• Base field: \(\Q(\sqrt{33}) \)
• Conductor norm: \( 132 \)
• CM: no
• Base change: yes
• Q-curve: yes
• Torsion order: \( 2 \)
• Rank: \( 0 \)

Base field \(\Q(\sqrt{33}) \)

Generator \(a\), with minimal polynomial \( x^{2} - x - 8 \); class number \(1\).

Weierstrass equation

\({y}^2+{x}{y}+{y}={x}^{3}+{x}^{2}-12{x}-81\)

This is a global minimal model.

Mordell-Weil group structure

\(\Z/{2}\Z\)

Mordell-Weil generators

$P$	$\hat{h}(P)$	Order
$\left(\frac{19}{4} : -\frac{23}{8} : 1\right)$	$0$	$2$

Invariants

Conductor:	$\frak{N}$	=	\((-4a+2)\)	=	\((-a-2)\cdot(-a+3)\cdot(-2a+7)\cdot(-4a-9)\)
Conductor norm:	$N(\frak{N})$	=	\( 132 \)	=	\(2\cdot2\cdot3\cdot11\)
Discriminant:	$\Delta$	=	$-2371842$
Discriminant ideal:	$\frak{D}_{\mathrm{min}} = (\Delta)$	=	\((-2371842)\)	=	\((-a-2)\cdot(-a+3)\cdot(-2a+7)^{8}\cdot(-4a-9)^{8}\)
Discriminant norm:	$N(\frak{D}_{\mathrm{min}}) = N(\Delta)$	=	\( 5625634472964 \)	=	\(2\cdot2\cdot3^{8}\cdot11^{8}\)
j-invariant:	$j$	=	\( -\frac{192100033}{2371842} \)
Endomorphism ring:	$\mathrm{End}(E)$	=	\(\Z\)
Geometric endomorphism ring:	$\mathrm{End}(E_{\overline{\Q}})$	=	\(\Z\)    (no potential complex multiplication)
Sato-Tate group:	$\mathrm{ST}(E)$	=	$\mathrm{SU}(2)$

BSD invariants

Analytic rank:	$r_{\mathrm{an}}$	=	\( 0 \)
Mordell-Weil rank:	$r$	=	\(0\)
Regulator:	$\mathrm{Reg}(E/K)$	=	\( 1 \)
Néron-Tate Regulator:	$\mathrm{Reg}_{\mathrm{NT}}(E/K)$	=	\( 1 \)
Global period:	$\Omega(E/K)$	≈	\( 1.2148283734558742135134834892675530641 \)
Tamagawa product:	$\prod_{\frak{p}}c_{\frak{p}}$	=	\( 4 \)  =  \(1\cdot1\cdot2\cdot2\)
Torsion order:	$\#E(K)_{\mathrm{tor}}$	=	\(2\)
Special value:	$L^{(r)}(E/K,1)/r!$	≈	\( 3.3835916102347468693057686375431667286 \)
Analytic order of Ш:	Ш${}_{\mathrm{an}}$	=	\( 16 \) (rounded)

BSD formula

$$\begin{aligned}3.383591610 \approx L(E/K,1) & \overset{?}{=} \frac{ \# Ш(E/K) \cdot \Omega(E/K) \cdot \mathrm{Reg}_{\mathrm{NT}}(E/K) \cdot \prod_{\mathfrak{p}} c_{\mathfrak{p}} } { \#E(K)_{\mathrm{tor}}^2 \cdot \left|d_K\right|^{1/2} } \\ & \approx \frac{ 16 \cdot 1.214828 \cdot 1 \cdot 4 } { {2^2 \cdot 5.744563} } \\ & \approx 3.383591610 \end{aligned}$$

Local data at primes of bad reduction

This elliptic curve is semistable. There are 4 primes $\frak{p}$ of bad reduction.

$\mathfrak{p}$	$N(\mathfrak{p})$	Tamagawa number	Kodaira symbol	Reduction type	Root number	\(\mathrm{ord}_{\mathfrak{p}}(\mathfrak{N}\))	\(\mathrm{ord}_{\mathfrak{p}}(\mathfrak{D}_{\mathrm{min}}\))	\(\mathrm{ord}_{\mathfrak{p}}(\mathrm{den}(j))\)
\((-a-2)\)	\(2\)	\(1\)	\(I_{1}\)	Split multiplicative	\(-1\)	\(1\)	\(1\)	\(1\)
\((-a+3)\)	\(2\)	\(1\)	\(I_{1}\)	Split multiplicative	\(-1\)	\(1\)	\(1\)	\(1\)
\((-2a+7)\)	\(3\)	\(2\)	\(I_{8}\)	Non-split multiplicative	\(1\)	\(1\)	\(8\)	\(8\)
\((-4a-9)\)	\(11\)	\(2\)	\(I_{8}\)	Non-split multiplicative	\(1\)	\(1\)	\(8\)	\(8\)

Galois Representations

The mod \( p \) Galois Representation has maximal image for all primes \( p < 1000 \) except those listed.

prime	Image of Galois Representation
\(2\)	2B

Isogenies and isogeny class

This curve has non-trivial cyclic isogenies of degree \(d\) for \(d=\) 2, 4 and 8.
Its isogeny class 132.1-d consists of curves linked by isogenies of degrees dividing 8.

Base change

This elliptic curve is a \(\Q\)-curve. It is the base change of the following 2 elliptic curves:

Base field	Curve
\(\Q\)	66.b3
\(\Q\)	2178.g3