English

Congruence formulae for Legendre modular polynomials

Number Theory 2017-04-25 v1 Algebraic Geometry

Abstract

Let p5p\geq 5 be a prime number. We generalize the results of E. de Shalit about supersingular jj-invariants in characteristic pp. We consider supersingular elliptic curves with a basis of 22-torsion over Fp\overline{\mathbf{F}}_p, or equivalently supersingular Legendre λ\lambda-invariants. Let Fp(X,Y)Z[X,Y]F_p(X,Y) \in \mathbf{Z}[X,Y] be the pp-th modular polynomial for λ\lambda-invariants. A simple generalization of Kronecker's classical congruence shows that R(X):=Fp(X,Xp)pR(X):=\frac{F_p(X,X^{p})}{p} is in Z[X]\mathbf{Z}[X]. We give a formula for R(λ)R(\lambda) if λ\lambda is a supersingular. This formula is related to the Manin--Drinfeld pairing used in the pp-adic uniformization of the modular curve X(Γ0(p)Γ(2))X(\Gamma_0(p)\cap \Gamma(2)). This pairing was computed explicitly modulo principal units in a previous work of both authors. Furthermore, if λ\lambda is supersingular and lives in Fp\mathbf{F}_p, then we also express R(λ)R(\lambda) in terms of a CM lift (which are showed to exist) of the Legendre elliptic curve associated to λ\lambda.

Keywords

Cite

@article{arxiv.1704.06941,
  title  = {Congruence formulae for Legendre modular polynomials},
  author = {Adel Betina and Emmanuel Lecouturier},
  journal= {arXiv preprint arXiv:1704.06941},
  year   = {2017}
}

Comments

18 pages

R2 v1 2026-06-22T19:24:58.990Z