Algebraic reflexivity of linear transformations
Algebraic reflexivity of linear transformations
Let $\mathcal {L}(U, V)$ be the set of all linear transformations from $U$ to $V$, where $U$ and $V$ are vector spaces over a field $\mathbb {F}$. We show that every $n$-dimensional subspace of $\mathcal {L}(U, V)$ is algebraically $\lfloor \sqrt {2n} \rfloor$-reflexive, where $\lfloor \ t \ \rfloor$ denotes …