Rational points on algebraic curves in infinite towers of number fields

Abstract

We study a natural question in the Iwasawa theory of algebraic curves of genus >1. Fix a prime number p. Let X be a smooth, projective, geometrically irreducible curve defined over a number field K of genus g>1, such that the Jacobian of X has good ordinary reduction at the primes above p. Fix an odd prime p and for any integer n>1, let Kn(p) denote the degree-pn extension of K contained in K(μp∞). We prove explicit results for the growth of \#X(Kn(p)) as n→ ∞. When the Jacobian of X has rank zero and the associated adelic Galois representation has big image, we prove an explicit condition under which X(Kn(p))=X(K) for all n. This condition is illustrated through examples. We also prove a generalization of Imai's theorem that applies to abelian varieties over arbitrary pro-p extensions.

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