Endomorphism Rings of Supersingular Elliptic Curves and Ternary Quadratic Forms

Abstract

Let c<3p/16 be a prime or c=1. Let E be a Z[-cp]-oriented supersingular elliptic curve defined over Fp2. There exists a c-isogeny from E to Ep with kernel G ⊂ E[c]. Given an Eichler order corresponding to the endomorphism ring End(E,G)=\ θ ∈ End(E): θ(G) ⊂eq G \, we can compute a ternary quadratic form with discriminant p by solving two square roots in Fc, and the ternary quadratic form corresponds to a maximal order O End(E) in Bp,∞ by Brandt--Sohn correspondence. Let D be a prime with D<p (resp. 4D<p). If an imaginary quadratic order with discriminant -D (resp. -4D) can be embedded into End(E), then we can compute a maximal order in Bp,∞ corresponding to End(E) by solving one square root in FD and two square roots in Fc. As we know, any isogeny between supersingular elliptic curves can be translated into a kernel ideal of the endomorphism ring. We study the action of the kernel ideal and give a basis of its right order. In general, we propose an efficient algorithm for computing a maximal order from an Eichler order in Bp,∞.