Cremona's table of elliptic curves

Conductor 61752

61752 = 2³ · 3 · 31 · 83

Isogeny classes of curves of conductor 61752 [newforms of level 61752]

Class

r

Atkin-Lehner

Eigenvalues

61752a (1 curve)

0

²+ ³+ ³¹+ ⁸³-

²+ ³+ -1 1 0 1 -7 4

61752b (1 curve)

1

²+ ³+ ³¹- ⁸³-

²+ ³+ 1 1 -2 6 -6 3

61752c (1 curve)

1

²+ ³+ ³¹- ⁸³-

²+ ³+ -1 1 0 1 -3 2

61752d (1 curve)

1

²+ ³+ ³¹- ⁸³-

²+ ³+ -2 -2 -5 0 -3 6

61752e (1 curve)

1

²+ ³+ ³¹- ⁸³-

²+ ³+ -2 3 0 5 2 -4

61752f (1 curve)

1

²+ ³+ ³¹- ⁸³-

²+ ³+ 3 3 0 -5 7 -4

61752g (1 curve)

0

²+ ³- ³¹+ ⁸³+

²+ ³- -1 -3 0 -5 3 0

61752h (2 curves)

1

²+ ³- ³¹- ⁸³+

²+ ³- 0 0 4 0 -2 0

61752i (1 curve)

0

²- ³+ ³¹+ ⁸³+

²- ³+ 1 2 2 -4 -2 -4

61752j (1 curve)

0

²- ³+ ³¹+ ⁸³+

²- ³+ -1 5 4 -7 -3 -4

61752k (1 curve)

1

²- ³+ ³¹+ ⁸³-

²- ³+ -3 -4 1 4 4 1

61752l (4 curves)

1

²- ³+ ³¹- ⁸³+

²- ³+ -2 0 -4 6 -2 0

61752m (1 curve)

1

²- ³+ ³¹- ⁸³+

²- ³+ -2 3 2 -3 4 -6

61752n (1 curve)

0

²- ³- ³¹- ⁸³+

²- ³- -2 0 3 6 -3 0

61752o (1 curve)

0

²- ³- ³¹- ⁸³+

²- ³- -2 3 6 -3 0 6

61752p (1 curve)

2

²- ³- ³¹- ⁸³+

²- ³- -3 -1 0 -1 -3 -8

61752q (1 curve)

1

²- ³- ³¹- ⁸³-

²- ³- -1 3 4 3 -1 2

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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