Cremona's table of elliptic curves

Conductor 93795

93795 = 3 · 5 · 13² · 37

Isogeny classes of curves of conductor 93795 [newforms of level 93795]

Class

r

Atkin-Lehner

Eigenvalues

93795a (1 curve)

1

³+ ⁵+ ¹³+ ³⁷+

0 ³+ ⁵+ 3 -2 ¹³+ 2 4

93795b (2 curves)

1

³+ ⁵+ ¹³+ ³⁷+

1 ³+ ⁵+ 0 -2 ¹³+ 8 -4

93795c (2 curves)

1

³+ ⁵+ ¹³+ ³⁷+

1 ³+ ⁵+ 2 0 ¹³+ 0 0

93795d (4 curves)

1

³+ ⁵+ ¹³+ ³⁷+

1 ³+ ⁵+ -4 0 ¹³+ -6 -4

93795e (1 curve)

0

³+ ⁵+ ¹³+ ³⁷-

0 ³+ ⁵+ 4 0 ¹³+ 4 -6

93795f (2 curves)

0

³+ ⁵+ ¹³- ³⁷+

-1 ³+ ⁵+ -4 -2 ¹³- -4 -4

93795g (2 curves)

1

³+ ⁵+ ¹³- ³⁷-

1 ³+ ⁵+ -2 2 ¹³- 2 4

93795h (1 curve)

0

³+ ⁵- ¹³+ ³⁷+

0 ³+ ⁵- -4 0 ¹³+ 4 6

93795i (1 curve)

1

³+ ⁵- ¹³+ ³⁷-

0 ³+ ⁵- 2 5 ¹³+ 3 -5

93795j (1 curve)

1

³+ ⁵- ¹³+ ³⁷-

0 ³+ ⁵- -3 2 ¹³+ 2 -4

93795k (4 curves)

1

³+ ⁵- ¹³+ ³⁷-

-1 ³+ ⁵- 0 0 ¹³+ -2 -4

93795l (2 curves)

1

³+ ⁵- ¹³- ³⁷+

-1 ³+ ⁵- 2 -2 ¹³- 2 -4

93795m (2 curves)

0

³+ ⁵- ¹³- ³⁷-

1 ³+ ⁵- 4 2 ¹³- -4 4

93795n (2 curves)

0

³- ⁵+ ¹³+ ³⁷+

0 ³- ⁵+ -2 0 ¹³+ 6 -2

93795o (1 curve)

0

³- ⁵+ ¹³+ ³⁷+

0 ³- ⁵+ 4 -4 ¹³+ 0 6

93795p (6 curves)

0

³- ⁵+ ¹³+ ³⁷+

1 ³- ⁵+ 0 4 ¹³+ -6 4

93795q (1 curve)

0

³- ⁵+ ¹³+ ³⁷+

-1 ³- ⁵+ 2 2 ¹³+ -4 6

93795r (1 curve)

0

³- ⁵+ ¹³+ ³⁷+

-1 ³- ⁵+ 2 -6 ¹³+ 0 -2

93795s (2 curves)

1

³- ⁵+ ¹³+ ³⁷-

0 ³- ⁵+ -4 0 ¹³+ 0 8

93795t (2 curves)

1

³- ⁵+ ¹³+ ³⁷-

-1 ³- ⁵+ 2 -2 ¹³+ 6 4

93795u (2 curves)

1

³- ⁵+ ¹³+ ³⁷-

-1 ³- ⁵+ -2 2 ¹³+ -2 4

93795v (2 curves)

0

³- ⁵+ ¹³- ³⁷-

1 ³- ⁵+ 2 0 ¹³- 4 4

93795w (2 curves)

1

³- ⁵- ¹³+ ³⁷+

0 ³- ⁵- 4 0 ¹³+ 0 -8

93795x (1 curve)

0

³- ⁵- ¹³+ ³⁷-

0 ³- ⁵- 2 -4 ¹³+ -2 -6

93795y (1 curve)

0

³- ⁵- ¹³+ ³⁷-

0 ³- ⁵- -4 4 ¹³+ 0 -6

93795z (1 curve)

0

³- ⁵- ¹³+ ³⁷-

1 ³- ⁵- -2 -2 ¹³+ -4 -6

93795ba (1 curve)

0

³- ⁵- ¹³+ ³⁷-

1 ³- ⁵- -2 6 ¹³+ 0 2

93795bb (4 curves)

0

³- ⁵- ¹³+ ³⁷-

-1 ³- ⁵- 4 -4 ¹³+ -2 4

93795bc (4 curves)

0

³- ⁵- ¹³+ ³⁷-

-1 ³- ⁵- -4 0 ¹³+ 2 4

93795bd (2 curves)

0

³- ⁵- ¹³- ³⁷+

-1 ³- ⁵- -2 0 ¹³- 4 -4

Data from Elliptic Curve Data by J. E. Cremona.
Design inspired by The Modular Forms Explorer by William Stein.

Part of Computational Number Theory
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