-adic images of Galois for elliptic curves over Q

Abstract

We discuss the -adic case of Mazur's "Program B" over Q, the problem of classifying the possible images of -adic Galois representations attached to elliptic curves E over Q, equivalently, classifying the rational points on the corresponding modular curves. The primes =2 and 13 are addressed by prior work, so we focus on the remaining primes = 3, 5, 7, 11. For each of these , we compute the directed graph of arithmetically maximal -power level modular curves XH, compute explicit equations for all but three of them, and classify the rational points on all of them except X ns+(N), for N = 27, 25, 49, 121, and two level 49 curves of genus 9 whose Jacobians have analytic rank 9. Aside from the -adic images that are known to arise for infinitely many Q-isomorphism classes of elliptic curves E/Q, we find only 22 exceptional images that arise for any prime and any E/Q without complex multiplication; these exceptional images are realized by 20 non-CM rational j-invariants. We conjecture that this list of 22 exceptional images is complete and show that any counterexamples must arise from unexpected rational points on X ns+() with 19, or one of the six modular curves noted above. This yields a very efficient algorithm to compute the -adic images of Galois for any elliptic curve over Q. In an appendix with John Voight we generalize Ribet's observation that simple abelian varieties attached to newforms on 1(N) are of GL2-type; this extends Kolyvagin's theorem that analytic rank zero implies algebraic rank zero to isogeny factors of the Jacobian of XH.

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