Suppose we have an abelian variety $A$ defined over the rational numbers $\mathbb{Q}$. It is known that the Weil pairing $$ e_\ell: A[\ell]\times A[\ell] \rightarrow \mu_\ell $$ is non degenerate, which means that for every non zero point $P\in A[\ell]$, there exists a non zero point $Q \in A[\ell] \setminus<P>$, such that $e_\ell(P,Q)$ is a primitive $\ell$ root of unity.
Is there such a variety with the property that for almost all primes $\ell$ and for each point $P\in A[\ell]$ we have that $e_\ell(P,Q)$ is a primitive $\ell$ root of unity for all $Q\in A[\ell] \setminus<P>$?
I am not expert in this topic, so any comment or suggestion is welcome.
