The automorphism group of the pn-torsion points of an elliptic curve over a field of characteristic p 5

Abstract

For a field K of characteristic p5 and the elliptic curve Es,t: y2 = x3 + sx + t defined over the function field K(s,t) of two variables s and t, we prove that for a positive integer n, the automorphism group of the normal extension K(s,t)(Es,t[pn])/K(s,t) is isomorphic to (Z/pnZ)×, and its inseparable degree is pn.

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