Differentiability of functions defined on manifolds

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yifli
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Quoted from a book I'm reading:

if f is any function defined on a manifold M with values in Banach space, then f is differentiable if and only if it is differentiable as a map of manifolds.

what does it mean by 'differentiable as a map of manifolds'?
 
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Hi yifli! :smile:


(I assume that you have defined what a differentiable map is between Banach spaces).

Differentiability as a map of manifolds means:

Let [itex]\Phi:M\rightarrow X[/itex] be your map from M to a Banach space. And let [itex]x\in M[/itex], then x has an open neighbourhood which is homeomorphic to an open set of [itex]\mathbb{R}^n[/itex]. Thus there exists a homeomorphism [itex]a:U\rightarrow V[/itex] with U an open set in M that contaisn x and V open in [itex]\mathbb{R}^n[/itex].

Now, [itex]\Phi[/itex] is differentiable in x if and only if [itex]\Phi\circ a^{-1}[/itex] is differentiable.