For real finite dimensional vector spaces $V,W,Z$, i know that a map $f:V \times W \to Z$ is smooth if the maps $f(v,.)$ and $f(.,w)$ are for every $v\in V, w \in W$. Does the same thing hold for (possibly infinite dim.) locally convex spaces?
2026-03-25 14:20:54.1774448454
Differential calculus on locally convex spaces
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