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If $p$ is odd then $E(\mathbb{Q}_p)[p]$ is either trivial or one copy of $\mathbb{Z}/p\mathbb{Z}$ and that will be all of the $p$-primary torsion. For $p=2$, all of $E[2]$ can be defined over $\mathbb …

If $m$ is an integer coprime to the characteristic of $k$, then the pairing between $A^t(K)/m A^t(K)$ and the $m$-torsion part of $H^1(K,A)$ is compatible with the cup pairing $$H^1(K,A^t[m]) \times …

I don't think the action of Frobenius $\phi$ is trivial. The inf-res five term exact sequence reduces to a short exact sequence $$ 0\to \operatorname{Hom}\bigl(G/I, \mathbb{Q}/\mathbb{Z}\bigr)\to \ope …

I believe this is the answer in the split case: Let $E$ be the Tate curve with parameter $q$. Let $n>1$. We look for isogenies with cyclic kernel of order $n$. We may suppose that $n$ is prime. Firs …