Cremona's table of elliptic curves

Conductor 19314

19314 = 2 · 32 · 29 · 37

Isogeny classes of curves of conductor 19314 [newforms of level 19314]

Class r Atkin-Lehner Eigenvalues
19314a (1 curve) 1 2+ 3+ 29+ 37+ 2+ 3+  4 -1 -3  3  3 -1
19314b (1 curve) 2 2+ 3+ 29+ 37- 2+ 3+ -4 -5 -5  1  3  5
19314c (2 curves) 1 2+ 3+ 29- 37- 2+ 3+  0 -1  3  5  3  5
19314d (2 curves) 1 2+ 3+ 29- 37- 2+ 3+  2  0  0 -4 -2  6
19314e (1 curve) 1 2+ 3+ 29- 37- 2+ 3+  2 -3  0  2 -2  0
19314f (2 curves) 1 2+ 3- 29- 37+ 2+ 3- -2  0 -2  2 -2 -8
19314g (1 curve) 0 2+ 3- 29- 37- 2+ 3-  2 -2 -3  0  3  0
19314h (2 curves) 1 2- 3+ 29+ 37- 2- 3+  0 -1 -3  5 -3  5
19314i (2 curves) 1 2- 3+ 29+ 37- 2- 3+ -2  0  0 -4  2  6
19314j (1 curve) 1 2- 3+ 29+ 37- 2- 3+ -2 -3  0  2  2  0
19314k (1 curve) 1 2- 3+ 29- 37+ 2- 3+ -4 -1  3  3 -3 -1
19314l (1 curve) 0 2- 3+ 29- 37- 2- 3+  4 -5  5  1 -3  5
19314m (1 curve) 1 2- 3- 29+ 37+ 2- 3-  1 -4  3 -3  6 -4
19314n (1 curve) 1 2- 3- 29+ 37+ 2- 3-  2 -3 -1  5 -7 -5
19314o (1 curve) 1 2- 3- 29+ 37+ 2- 3- -4  3 -4  2  2 -2
19314p (2 curves) 0 2- 3- 29+ 37- 2- 3-  0 -1  0  2  6  2
19314q (1 curve) 0 2- 3- 29+ 37- 2- 3-  1  0 -5 -3 -6 -4
19314r (1 curve) 2 2- 3- 29+ 37- 2- 3- -2 -3 -3 -1 -7 -3

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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