Existence of non-elliptic mod l Galois representations for every l >5
Abstract
For = 3 and 5 it is known that every odd, irreducible, 2-dimensional representation of (/) with values in and determinant equal to the cyclotomic character must "come from" the -torsion points of an elliptic curve defined over . We prove, by giving concrete counter-examples, that this result is false for every prime >5.
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