Definition:Transpose of Linear Transformation

Definition
Let $R$ be a commutative ring.

Let $G$ and $H$ be $R$-modules.

Let $G^*$ and $H^*$ be the algebraic duals of $G$ and $H$ respectively.

Let $\map {\LL_R} {G, H}$ be the set of all linear transformations from $G$ to $H$.

Let $u \in \map {\LL_R} {G, H}$.

The transpose of $u$ is the mapping $u^t: H^* \to G^*$ defined as:
 * $\forall y' \in H^*: \map {u^t} {y'} = y' \circ u$

where $y' \circ u$ is the composition of $y'$ and $u$.

Also see

 * Definition:Transpose of Matrix


 * Transpose of Linear Transformation is a Linear Transformation