ag.algebraic geometry - Lie bracket on the unshifted tangent complex?

reference request – Existence of uniform approximator that too approximates by-product Answer

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reference request – Existence of uniform approximator that too approximates by-product

Let $S$ breathe a subset of $C^1([0, 1], mathbb{R})$. It is a well known proven fact that given a duty $fin C^1([0, 1], mathbb{R})$ and a sequence ${f_n}subset C^1([0,1], mathbb{R})$ such that $f_nto f$ uniformly, it doesn’t essentially maintain that $f_n’to f$ uniformly.

What situation on $S$ (or what situation on $f$) ought to we ordain to ensure the actuality of $f_n$ such that each $f_nto f$ and $f_n’to f’$ within the uniform sense? Are there any non-trivial outcomes to this query?

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