References
- Chiloyan, G. (2022). 2-adic Galois images of isogeny-torsion graphs over Q with CM. Int. J. Number Theory 19: 2483–2512.
- Chiloyan, G. (2023). Infinite families of isogeny-torsion graphs. J. Number Theory 244: 369–417. 10.1016/j.jnt.2022.09.009
- Chiloyan, G., Lozano-Robledo, Á. (2021). A classification of isogeny-torsion graphs of Q-isogeny classes of elliptic curves. Trans. London Math. Soc. 8(1): 1–34.
- Daniels, H. B., Gonzélez-Jiménez, E. (2022). Serre’s constant of elliptic curves over the rationals. Exp. Math. 31(2): 518–536. 10.1080/10586458.2019.1655816
- Kenku, M. A. (1982). On the number of Q-isomorphism classes of elliptic curves in each Q-isogeny class. J. Number Theory 15(2): 199–202.
- The LMFDB Collaboration. (2021). The L-functions and modular forms database. Avaliable at: http://www.lmfdb.org. [Online; accessed 4 March 2021].
- Lozano-Robledo, Á. (2013). On the field of definition of p-torsion points on elliptic curves over the rationals. Math. Ann. 357(1): 279–305. 10.1007/s00208-013-0906-5
- Mazur, B. (1978). Rational isogenies of prime degree (with an appendix by D. Goldfeld). Invent. Math. 44(2): 129–162. 10.1007/BF01390348
- Rouse, J., Sutherland, A. V., Zureick-Brown, D. (2022). l-adic images of galois for elliptic curves over Q (and an appendix with John Voight). Forum Math. Sigma 10: e62.
- Rouse, J., Zureick-Brown, D. (2015). Elliptic curves over Q and 2-adic images of Galois. Res. Number Theory 1:Art. 12, 34.
- Silverman, J. H. (2009). The Arithmetic of Elliptic Curves, volume 106 of Graduate Texts in Mathematics, 2nd ed. Dordrecht: Springer.
- Sutherland, A. V., Zywina, D. (2017). Modular curves of prime-power level with infinitely many rational points. Algebra Number Theory 11: 1199–1229. 10.2140/ant.2017.11.1199