Automorphisms of finite fields from isogeny cycles

Abstract

We develop an explicit geometric construction of automorphisms of finite fields arising from isogeny cycles. Let k be a finite field, E/k an elliptic curve, and an integer coprime to char(k). Let h be an ideal of End(E) dividing , and consider the corresponding torsion subgroup E[h]⊂eq E[]. From the action of End(E) on E[h], we construct the splitting field K of the x-coordinates of points in E[h] and the associated Galois group Gal(K/k). This yields (End(E)/h)* Gal(K/k) a group homomorphism.

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