Can prime fields act two ways on the same abelian group?

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imurme8
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A problem asks to find an abelian group [itex]V[/itex] and a field [itex]F[/itex] such that there exist two different actions, call them [itex]\cdot[/itex] and [itex]\odot[/itex], of [itex]F[/itex] on [itex]V[/itex] such that [itex]V[/itex] is an [itex]F[/itex]-module.

A usual way to solve this is to take any vector space over a field with a non-trivial automorphism group, and define [itex]r\odot \mu[/itex] to be [itex]f(r)\cdot \mu[/itex] for [itex]f\in \text{Aut}(F), f\neq \iota[/itex].

My question is: is this essentially the only way? Given two different actions of [itex]F[/itex] on [itex]V[/itex], can we construct a non-trivial automorphism of [itex]F[/itex]?

Or, a weaker result: can we show that a prime field cannot act in two different ways on a module?
 
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We always have the trivial operation: ##F.V \equiv 0##.
Another example are direct versus semidirect products. And if the automorphism group is large enough, we can have different conjugations.

And ##D_{12} \cong V_4 \ltimes \mathbb{Z}_3 \cong D_6 \times \mathbb{Z}_2## might provide an example as we have two copies of ##\mathbb{Z}_2## here with a different operation on the rest.