A classification of curious Galois groups as direct products
Abstract
Let N be a positive integer. Let H be a group of level N and let E be an elliptic curve defined over the rationals with jE ≠ 0, 1728. Then the image E,N(Gal(Q/Q)), of the mod-N Galois representation attached to E, is conjugate to a subgroup of H if and only if E corresponds to a non-cuspidal rational point on the modular curve XH generated by H. In this article, we are interested when E,N(GQ) is precisely H. More precisely, we classify all groups H that are direct products of subgroups H for which XH contains infinitely many non-cuspidal rational points but there is no elliptic curve E/Q such that E,N(Gal(Q/Q)) is conjugate to H.
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