English

Elliptic curves over Hasse pairs

Number Theory 2025-07-01 v1 Cryptography and Security

Abstract

We call a pair of distinct prime powers (q1,q2)=(p1a1,p2a2)(q_1,q_2) = (p_1^{a_1},p_2^{a_2}) a Hasse pair if q1q21|\sqrt{q_1}-\sqrt{q_2}| \leq 1. For such pairs, we study the relation between the set E1\mathcal{E}_1 of isomorphism classes of elliptic curves defined over Fq1\mathbb{F}_{q_1} with q2q_2 points, and the set E2\mathcal{E}_2 of isomorphism classes of elliptic curves over Fq2\mathbb{F}_{q_2} with q1q_1 points. When both families Ei\mathcal{E}_i contain only ordinary elliptic curves, we prove that their isogeny graphs are isomorphic. When supersingular curves are involved, we describe which curves might belong to these sets. We also show that if both the qiq_i's are odd and E1E2\mathcal{E}_1 \cup \mathcal{E}_2 \neq \emptyset, then E1E2\mathcal{E}_1 \cup \mathcal{E}_2 always contains an ordinary elliptic curve. Conversely, if q1q_1 is even, then E1E2\mathcal{E}_1 \cup \mathcal{E}_2 may contain only supersingular curves precisely when q2q_2 is a given power of a Fermat or a Mersenne prime. In the case of odd Hasse pairs, we could not rule out the possibility of an empty union E1E2\mathcal{E}_1 \cup \mathcal{E}_2, but we give necessary conditions for such a case to exist. In an appendix, Moree and Sofos consider how frequently Hasse pairs occur using analytic number theory, making a connection with Andrica's conjecture on the difference between consecutive primes.

Keywords

Cite

@article{arxiv.2406.03399,
  title  = {Elliptic curves over Hasse pairs},
  author = {Eleni Agathocleous and Antoine Joux and Daniele Taufer},
  journal= {arXiv preprint arXiv:2406.03399},
  year   = {2025}
}
R2 v1 2026-06-28T16:54:46.273Z