Talk:Uniformly convex space

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Just a note (to me and others). If I remember correctly, the notion of the uniform convexity also applies to some class of linear operators. (they are called uniform convex operators or something.) Since uniform convexity redirects here, this needs to be discussed. -- Taku (talk) 23:02, 4 June 2008 (UTC)

I just undid a pair of edits giving a wrong counterexample to the Milman–Pettis theorem (the point being that $$\ell^1(\mathbb{N})$$ is not reflexive. A trivial counterexample would be $$\ell^1(F)$$ for any finite set $$F$$, but that is too trivial to deserve mention. A proper counterexample would be a reflexive space with no equivalent uniformly convex norm. I think such a counterexample exists; I will try to find one in the literature and add a reference if I succeed. Hanche (talk) 21:04, 20 January 2013 (UTC)
 * Just noticed that the edit didn't “take”, don't know why. Redone now. My promised update will have to wait, as my university has lost MathSciNet access for reasons unknown. Hanche (talk) 10:31, 22 January 2013 (UTC)
 * I found a reference to a counterexample – decided to put it in the article on the Milman–Pettis theorem instead. Hanche (talk) 11:10, 24 January 2013 (UTC)

Hi there. I would like to alert you that, if I am not mistaken, euclidean vector spaces (i.e. finite-dimensional spaces with a norm induced by a real inner product) are uniformly convex. Maybe this should be added to the list of examples (after re-checking that it is true). -- Anonymous — Preceding unsigned comment added by 2A05:3E00:C:1003:0:0:220:252 (talk) 13:32, 24 May 2022 (UTC)