On 5-torsion of CM elliptic curves
Abstract
Let E be an elliptic curve defined over a number field K. Let m be a positive integer. We denote by E[m] the m-torsion subgroup of E and by Km:=K(E[m]) the number field obtained by adding to K the coordinates of the points of E[m]. We describe the fields K5, when E is a CM elliptic curve defined over K, with Weiestrass form either y2=x3+bx or y2=x3+c. In particular we classify the fields K5 in terms of generators, degrees and Galois groups. Furthermore we show some applications of those results to the Local-Global Divisibility Problem, to modular curves and to Shimura curves.
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