Talk:Palais–Smale compactness condition

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definition of "derivative" in the strong formulation

Latest comment: 16 years ago1 comment1 person in discussion

An anon editor added:

Here ${\displaystyle I'[x]}$  denotes the Fréchet derivative of ${\displaystyle I}$  at ${\displaystyle x\in H}$ .

Well, yes and no. I is a functional on a Hilbert space; the domain is reflexive and the range is the reals (also a Hilbert space, but also the space of scalars). We can make a stronger statement:

I is differentiable at ${\displaystyle u\in H}$  if there exists ${\displaystyle v\in H}$  such that

${\displaystyle I[w]=I[u]+(v,w-u)+o(\Vert w-u\Vert )}$ 

for all ${\displaystyle w\in H}$ . Thus we can write ${\displaystyle I':H\rightarrow H}$  and ${\displaystyle I'[u]=v}$ .

Dunno how to work that into the article in a sensible way. I don't think it appears anywhere else in Wikipedia; for instance, it doesn't appear in the Derivative (generalizations) article. Lunch (talk) 23:26, 27 January 2008 (UTC)Reply