Are there endofunctors $F$ and $G$ of the category of finite sets such that there are infinitely many natural transformations from $F$ to $G$?
Same question with $F$ and $G$ contravariant.
2026-04-04 15:10:50.1775315450
Is $\text{Hom}(F,G)$ finite if $F$ and $G$ are endofunctors of the category of finite sets?
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