Isogenies of non-CM elliptic curves with rational j-invariants over number fields
Abstract
We unconditionally determine I(d), the set of possible prime degrees of cyclic K-isogneies of elliptic curves with -rational j-invariants and without complex multiplication over number fields K of degree ≤ d, for d≤ 7, and give an upper bound for I(d) for d>7. Assuming Serre's uniformity conjecture, we determine I(d) exactly for all positive integers d.
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