Let $L/K$ be an extension of number fields and $A/K$ an abelian variety (or an elliptic curve, or a modular abelian variety). Then what can we say about the structure of $A(L)/A(K)$ (or of $A(L)_{\text{tor}}/A(K)_{\text{tor}}$, or of $A(L)_{\text{non tor}}/A(K)_{\text{non tor}}$)? Are there any researches?
For example, if $L$ is of exponent $2$ and if $A$ is the jacobian variety of a hyperelliptic curve, then we know that the prime to $2$ part of $A(L)$ is isomorphic to the one of $\oplus_\chi A^\chi(K)$. (where the product takes all twist of $A/K$ over $L$.)
