Diophantine rank stability and non-vanishing of $L$-functions
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Abstract
Let $A/\mathbb{Q}$ be a modular abelian variety of analytic rank $0$.
If $G$ is a non-trivial finite abelian group such that all prime factors of $\lvert G \rvert$ are sufficiently large in terms of $A$, we show that there are infinitely many $G$-extensions $F/\mathbb{Q}$ such that $A(F)$ is finite.
When $A$ is a rational elliptic curve of analytic rank zero with no exceptional primes, or the product of two such curves, the same conclusion holds without any assumptions on $|G|$.
Our proof relies on new simultaneous non-vanishing results for twisted central $L$-values of even-weight holomorphic newforms.
These results are obtained via novel constructions related to horizontal $p$-adic $L$-functions and are of independent interest.